US Patent Application for AI/ML EMPOWERED HIGH ORDER MODULATION Patent Application (Application #20240187295 issued June 6, 2024) (2024)

CROSS-REFERENCE TO RELATED APPLICATION AND CLAIM OF PRIORITY

This application claims priority under 35 U.S.C. § 119(e) to U.S. Provisional Patent Application No. 63/417,577 filed Oct. 19, 2022. The content of the above-identified patent document(s) is incorporated herein by reference.

TECHNICAL FIELD

The present disclosure relates generally to determining two-dimensional constellations for data signals and, more specifically, to improving bitwise mutual information of data points for such constellations.

BACKGROUND

To meet the demand for wireless data traffic having increased since deployment of 4G communication systems and to enable various vertical applications, 6G/5G/NR communication systems have been developed and are currently being deployed. The 6G/5G/NR communication system is considered to be implemented in higher frequency (mmWave) bands, e.g., 28 giga-Hertz (GHz) or 60 GHz bands, so as to accomplish higher data rates or in lower frequency bands, such as 6 GHz, to enable robust coverage and mobility support. To decrease propagation loss of the radio waves and increase the transmission distance, the beamforming, massive multiple-input multiple-output (MIMO), full dimensional MIMO (FD-MIMO), array antenna, an analog beam forming, large scale antenna techniques are discussed in 5G/NR communication systems.

In addition, in 6G/5G/NR communication systems, development for system network improvement is under way based on advanced small cells, cloud radio access networks (RANs), ultra-dense networks, device-to-device (D2D) communication, wireless backhaul, moving network, cooperative communication, coordinated multi-points (CoMP), reception-end interference cancelation and the like.

The discussion of 6G and 5G systems and frequency bands associated therewith is for reference as certain embodiments of the present disclosure may be implemented in 6G/5G systems. However, the present disclosure is not limited to 6G/5G systems or the frequency bands associated therewith, and embodiments of the present disclosure may be utilized in connection with any frequency band. For example, aspects of the present disclosure may also be applied to deployment of 6G/5G communication systems, 6G or even later releases which may use terahertz (THz) bands.

SUMMARY

A two-dimensional constellation for data signals having improved bitwise mutual information of data points is based on a signal-to-noise ratio (SNR) and a code rate where, based on the SNR, data bits are mapped to pre-defined in-phase and quadrature values. The in-phase and quadrature values denote points in the two-dimensional space such that the efficiency of bitwise mutual information is adapted based on the SNR. The mapping is preferably subject to a constraint selected from one of quadrant symmetry Lagrangian (QSL), quadrant symmetry constraint (QSC), or rectangular structure constraint (RSC). The mapping may be according to one of TABLE 6, TABLE 7, TABLE 8, or TABLE 8 herein.

In a first embodiment, a method includes receiving configuration information including a signal-to-noise ratio (SNR) and a code rate, and mapping, based on the SNR, data bits to pre-defined in-phase and quadrature values. The in-phase and quadrature values denote points on a 2D space such that bitwise mutual information is maximized.

In a second embodiment, an apparatus includes a transceiver configured to receive configuration information including a signal-to-noise ratio (SNR) and a code rate. The apparatus also includes a controller configured to map, based on the SNR, data bits to pre-defined in-phase and quadrature values. The in-phase and quadrature values denote points on a two-dimensional (2D) space such that optimality of bitwise mutual information is adapted based on the SNR.

In a third embodiment, a method includes determining configuration information including a signal-to-noise ratio (SNR) and a code rate for use in mapping, based on the SNR, data bits to pre-defined in-phase and quadrature values. The method also includes transmitting the configuration information. The in-phase and quadrature values denote points on a two-dimensional (2D) space such that optimality of bitwise mutual information is adapted based on the SNR.

In any of the preceding embodiments, the mapping may be subject to a constraint selected from one of QSL, QSC, or RSC.

In the preceding embodiment, the mapping may be according to one of TABLE 6, TABLE 7, TABLE 8, or TABLE 9 herein.

Other technical features may be readily apparent to one skilled in the art from the following figures, descriptions, and claims.

Before undertaking the DETAILED DESCRIPTION below, it may be advantageous to set forth definitions of certain words and phrases used throughout this patent document. The term “couple” and its derivatives refer to any direct or indirect communication between two or more elements, whether those elements are in physical contact with one another. The terms “transmit,” “receive,” and “communicate,” as well as derivatives thereof, encompass both direct and indirect communication. The terms “include” and “comprise,” as well as derivatives thereof, mean inclusion without limitation. The term “or” is inclusive, meaning and/or. The phrase “associated with,” as well as derivatives thereof, means to include, be included within, interconnect with, contain, be contained within, connect to or with, couple to or with, be communicable with, cooperate with, interleave, juxtapose, be proximate to, be bound to or with, have, have a property of, have a relationship to or with, or the like. The term “controller” means any device, system or part thereof that controls at least one operation. Such a controller may be implemented in hardware or a combination of hardware and software and/or firmware. The functionality associated with any particular controller may be centralized or distributed, whether locally or remotely. The phrase “at least one of,” when used with a list of items, means that different combinations of one or more of the listed items may be used, and only one item in the list may be needed. For example, “at least one of: A, B, and C” includes any of the following combinations: A, B, C, A and B, A and C, B and C, and A and B and C. Likewise, the term “set” means one or more. Accordingly, a set of items can be a single item or a collection of two or more items.

Moreover, various functions described below can be implemented or supported by one or more computer programs, each of which is formed from computer readable program code and embodied in a computer readable medium. The terms “application” and “program” refer to one or more computer programs, software components, sets of instructions, procedures, functions, objects, classes, instances, related data, or a portion thereof adapted for implementation in a suitable computer readable program code. The phrase “computer readable program code” includes any type of computer code, including source code, object code, and executable code. The phrase “computer readable medium” includes any type of medium capable of being accessed by a computer, such as read only memory (ROM), random access memory (RAM), a hard disk drive, a compact disc (CD), a digital video disc (DVD), or any other type of memory. A “non-transitory” computer readable medium excludes wired, wireless, optical, or other communication links that transport transitory electrical or other signals. A non-transitory computer readable medium includes media where data can be permanently stored and media where data can be stored and later overwritten, such as a rewritable optical disc or an erasable memory device.

Definitions for other certain words and phrases are provided throughout this patent document. Those of ordinary skill in the art should understand that in many if not most instances, such definitions apply to prior as well as future uses of such defined words and phrases.

BRIEF DESCRIPTION OF THE DRAWINGS

For a more complete understanding of this disclosure and its advantages, reference is now made to the following description, taken in conjunction with the accompanying drawings, in which:

FIG. 1 illustrates an exemplary networked system utilizing AI/ML empowered high order modulation in a cellular system according to various embodiments of this disclosure;

FIG. 2 illustrates an exemplary base station (BS) utilizing AI/ML empowered high order modulation according to various embodiments of this disclosure;

FIG. 3 illustrates an exemplary electronic device for communicating in the networked computing system utilizing AI/ML empowered high order modulation according to various embodiments of this disclosure;

FIG. 4 illustrates a high level diagram of an overall setup for AI/ML empowered high order modulation according to various embodiments of this disclosure;

FIGS. 5A and 5B illustrate high level diagrams of the encoder and decoder, respectively, for a bitwise autoencoder architecture for AI/ML empowered high order modulation according to various embodiments of this disclosure;

FIG. 6 illustrates an example 64-ary constellation for lower code rates of ⅓;

FIG. 7 illustrates an example 64-ary constellation for a higher code rate of 11/15;

FIG. 8 comparatively illustrates the coded BER as a function of ratio of bit energy to noise power spectral density (Eb/N0) for 64-ary constellations from NN with ATSC, DVB and with uniform QAM;

FIGS. 9A and 9B illustrate examples of 256-ary constellations for a higher code rate of ⅘;

FIG. 10 illustrates an example of a 256-ary constellation for lower code rate of ⅔;

FIG. 11 illustrates simulation results comparing the coded BER of 256-ary constellations from NN with ATSC, DVB and uniform QAM;

FIG. 12 illustrates an example of a 1024-ary constellations for higher code rate of ⅘ obtained by NN;

FIG. 13 illustrates an example of a 1024-ary constellation for lower code rate of ⅗ obtained by NN;

FIG. 14 illustrates an architecture for a QSC-autoencoder according to various embodiments of this disclosure;

FIG. 15 illustrates an example of 1024-ary constellations for higher code rate of ⅘ obtained by NN-QSC;

FIG. 16 illustrates an example of 1024-ary constellations for lower code rate of ⅗ obtained by NN-QSC;

FIG. 17 illustrates an architecture for an RSC-autoencoder according to various embodiments of this disclosure;

FIGS. 18A and 18B illustrate 1024-ary constellations obtained by NN-RSC, respectively for a higher code rate of ⅘ and a lower code rate of ⅗; and

FIG. 19 illustrates simulation results comparing the coded BER of 1024-ary constellations from NN and NN-QSC with ATSC and uniform QAM.

DETAILED DESCRIPTION

The figures included herein, and the various embodiments used to describe the principles of the present disclosure are by way of illustration only and should not be construed in any way to limit the scope of the disclosure. Further, those skilled in the art will understand that the principles of the present disclosure may be implemented in any suitably arranged wireless communication system.

REFERENCES

• [1] Cammerer, Sebastian, et al. “Trainable communication systems: Concepts and prototype.” IEEE Transactions on Communications 68.9 (2020): 5489-5503.
  The above-identified reference(s) are incorporated herein by reference.

The design of optimum modulation schemes guarantees effective use of spectrum with increased capacity. The square quadrature amplitude modulation (QAM) schemes of 16/64/256/1024 modulation orders have been widely adopted in various communication standards, but fundamentally exhibit a shaping loss of up to 1.53 decibels (dB) loss with respect to the Shannon capacity bound, in terms of the required signal to noise ratio (SNR) for a target date rate. Channel capacity is shown to be approached by equiprobable constellation symbols with geometrical Gaussian-like signal shaping. Thus, there are significant gains to be achieved with designing an optimum modulation scheme.

This disclosure pertains to the design of artificial intelligence (AI)/machine learning (ML) empowered modulation schemes, i.e., non-uniform constellations and bit-to-symbol mapping, for different modulation orders (64/256/1024) under various SNR conditions.

Designing of modulation schemes is essentially an optimization problem under certain constraints. The bit-wise mutual information is the achievable rate for bit-metric decoding (BMD) at receiver for bit-interleaved coded modulation (BICM) systems. Maximizing BICM capacity is equivalent to maximizing the bit-wise mutual information (BMI)—that is, the loss function binary cross entropy (BCE) is closely related to BMI, which is the achievable rate in BICM systems with bot-metric decoding (BCD) at the receiver. Thus, designing the modulation scheme is an optimization problem under constraints imposed due to power constraints.

Various conventional optimization techniques can be used for the above problem, but their complexity increases with increase in number of parameters, which is the case in higher order modulation. Thus, AI/ML is employed as optimization tool to design optimal modulation schemes for higher order modulation. Training the model for convergence to clean constellations is very challenging, especially for higher order modulations. To help with convergence, and to also obtain cleaner constellations with desirable properties, three different architectures for modulation optimization are proposed: quadrant symmetry Lagrangian (QSL); quadrant symmetry constraint (QSC); and rectangular structure constraint (RSC).

A detailed description of systems and methods consistent with embodiments of the present disclosure is provided below. While several embodiments are described, it should be understood that the disclosure is not limited to any one embodiment, but instead encompasses numerous alternatives, modifications, and equivalents. In addition, while numerous specific details are set forth in the following description in order to provide a thorough understanding of the embodiments disclosed herein, some embodiments can be practiced without some or all of these details. Moreover, for the purpose of clarity, certain technical material that is known in the related art has not been described in detail in order to avoid unnecessarily obscuring the disclosure.

FIGS. 1-3 below describe various embodiments implemented in wireless communications systems and with the use of orthogonal frequency division multiplexing (OFDM) or orthogonal frequency division multiple access (OFDMA) communication techniques. The descriptions of FIGS. 1-3 are not meant to imply physical or architectural limitations to the manner in which different embodiments may be implemented. Different embodiments of the present disclosure may be implemented in any suitably arranged communications system.

FIG. 1 illustrates an exemplary networked system utilizing AI/ML empowered high order modulation in a cellular system according to various embodiments of this disclosure. The embodiment of the wireless network shown in FIG. 1 is for illustration only. Other embodiments of the wireless network 100 could be used without departing from the scope of this disclosure.

As shown in FIG. 1, the wireless network includes a gNB 101 (e.g., base station, BS), a gNB 102, and a gNB 103. The gNB 101 communicates with the gNB 102 and the gNB 103. The gNB 101 also communicates with at least one network 130, such as the Internet, a proprietary Internet Protocol (IP) network, or other data network.

The gNB 102 provides wireless broadband access to the network 130 for a first plurality of user equipments (UEs) within a coverage area 120 of the gNB 102. The first plurality of UEs includes a UE 111, which may be located in a small business; a UE 112, which may be located in an enterprise; a UE 113, which may be a WiFi hotspot; a UE 114, which may be located in a first residence; a UE 115, which may be located in a second residence; and a UE 116, which may be a mobile device, such as a cell phone, a wireless laptop, a wireless PDA, or the like. The gNB 103 provides wireless broadband access to the network 130 for a second plurality of UEs within a coverage area 125 of the gNB 103. The second plurality of UEs includes the UE 115 and the UE 116. In some embodiments, one or more of the gNBs 101-103 may communicate with each other and with the UEs 111-116 using 5G/NR, long term evolution (LTE), long term evolution-advanced (LTE-A), WiMAX, WiFi, or other wireless communication techniques.

Depending on the network type, the term “base station” or “BS” can refer to any component (or collection of components) configured to provide wireless access to a network, such as transmit point (TP), transmit-receive point (TRP), an enhanced base station (eNodeB or eNB), a 5G/NR base station (gNB), a macrocell, a femtocell, a WiFi access point (AP), or other wirelessly enabled devices. Base stations may provide wireless access in accordance with one or more wireless communication protocols, e.g., 5G/NR 3rd generation partnership project (3GPP) NR, long term evolution (LTE), LTE advanced (LTE-A), high speed packet access (HSPA), Wi-Fi 802.11a/b/g/n/ac, etc. For the sake of convenience, the terms “BS” and “TRP” are used interchangeably in this patent document to refer to network infrastructure components that provide wireless access to remote terminals. Also, depending on the network type, the term “user equipment” or “UE” can refer to any component such as “mobile station,” “subscriber station,” “remote terminal,” “wireless terminal,” “receive point,” or “user device.” For the sake of convenience, the terms “user equipment” and “UE” are used in this patent document to refer to remote wireless equipment that wirelessly accesses a BS, whether the UE is a mobile device (such as a mobile telephone or smartphone) or is normally considered a stationary device (such as a desktop computer or vending machine).

Dotted lines show the approximate extents of the coverage areas 120 and 125, which are shown as approximately circular for the purposes of illustration and explanation only. It should be clearly understood that the coverage areas associated with gNBs, such as the coverage areas 120 and 125, may have other shapes, including irregular shapes, depending upon the configuration of the gNBs and variations in the radio environment associated with natural and man-made obstructions.

Although FIG. 1 illustrates one example of a wireless network, various changes may be made to FIG. 1. For example, the wireless network could include any number of gNBs and any number of UEs in any suitable arrangement. Also, the gNB 101 could communicate directly with any number of UEs and provide those UEs with wireless broadband access to the network 130. Similarly, each gNB 102-103 could communicate directly with the network 130 and provide UEs with direct wireless broadband access to the network 130. Further, the gNBs 101, 102, and/or 103 could provide access to other or additional external networks, such as external telephone networks or other types of data networks.

FIG. 2 illustrates an exemplary base station (BS) utilizing AI/ML empowered high order modulation according to various embodiments of this disclosure. The embodiment of the gNB 102 illustrated in FIG. 2 is for illustration only, and the gNBs 101 and 103 of FIG. 1 could have the same or similar configuration. However, gNBs come in a wide variety of configurations, and FIG. 2 does not limit the scope of this disclosure to any particular implementation of a gNB.

As shown in FIG. 2, the gNB 102 includes multiple antennas 205a-205n, multiple transceivers 210a-210n, a controller/processor 225, a memory 230, and a backhaul or network interface 235.

The transceivers 210a-210n receive, from the antennas 205a-205n, incoming RF signals, such as signals transmitted by UEs in the network 100. The transceivers 210a-210n down-convert the incoming RF signals to generate IF or baseband signals. The IF or baseband signals are processed by receive (RX) processing circuitry in the transceivers 210a-210n and/or controller/processor 225, which generates processed baseband signals by filtering, decoding, and/or digitizing the baseband or IF signals. The controller/processor 225 may further process the baseband signals.

Transmit (TX) processing circuitry in the transceivers 210a-210n and/or controller/processor 225 receives analog or digital data (such as voice data, web data, e-mail, or interactive video game data) from the controller/processor 225. The TX processing circuitry encodes, multiplexes, and/or digitizes the outgoing baseband data to generate processed baseband or IF signals. The transceivers 210a-210n up-converts the baseband or IF signals to RF signals that are transmitted via the antennas 205a-205n.

The controller/processor 225 can include one or more processors or other processing devices that control the overall operation of the gNB 102. For example, the controller/processor 225 could control the reception of UL channel signals and the transmission of DL channel signals by the transceivers 210a-210n in accordance with well-known principles. The controller/processor 225 could support additional functions as well, such as more advanced wireless communication functions. For instance, the controller/processor 225 could support beam forming or directional routing operations in which outgoing/incoming signals from/to multiple antennas 205a-205n are weighted differently to effectively steer the outgoing signals in a desired direction. Any of a wide variety of other functions could be supported in the gNB 102 by the controller/processor 225.

The controller/processor 225 is also capable of executing programs and other processes resident in the memory 230, such as an OS. The controller/processor 225 can move data into or out of the memory 230 as required by an executing process.

The controller/processor 225 is also coupled to the backhaul or network interface 235. The backhaul or network interface 235 allows the gNB 102 to communicate with other devices or systems over a backhaul connection or over a network. The interface 235 could support communications over any suitable wired or wireless connection(s). For example, when the gNB 102 is implemented as part of a cellular communication system (such as one supporting 5G/NR, LTE, or LTE-A), the interface 235 could allow the gNB 102 to communicate with other gNBs over a wired or wireless backhaul connection. When the gNB 102 is implemented as an access point, the interface 235 could allow the gNB 102 to communicate over a wired or wireless local area network or over a wired or wireless connection to a larger network (such as the Internet). The interface 235 includes any suitable structure supporting communications over a wired or wireless connection, such as an Ethernet or transceiver.

The memory 230 is coupled to the controller/processor 225. Part of the memory 230 could include a RAM, and another part of the memory 230 could include a Flash memory or other ROM.

Although FIG. 2 illustrates one example of gNB 102, various changes may be made to FIG. 2. For example, the gNB 102 could include any number of each component shown in FIG. 2. Also, various components in FIG. 2 could be combined, further subdivided, or omitted and additional components could be added according to particular needs.

FIG. 3 illustrates an exemplary electronic device for communicating in the networked computing system utilizing AI/ML empowered high order modulation according to various embodiments of this disclosure. The embodiment of the UE 116 illustrated in FIG. 3 is for illustration only, and the UEs 111-115 of FIG. 1 could have the same or similar configuration. However, UEs come in a wide variety of configurations, and FIG. 3 does not limit the scope of this disclosure to any particular implementation of a UE.

As shown in FIG. 3, the UE 116 includes antenna(s) 305, a transceiver(s) 310, and a microphone 320. The UE 116 also includes a speaker 330, a processor 340, an input/output (I/O) interface (IF) 345, an input 350, a display 355, and a memory 360. The memory 360 includes an operating system (OS) 361 and one or more applications 362.

The transceiver(s) 310 receives, from the antenna 305, an incoming RF signal transmitted by a gNB of the network 100. The transceiver(s) 310 down-converts the incoming RF signal to generate an intermediate frequency (IF) or baseband signal. The IF or baseband signal is processed by RX processing circuitry in the transceiver(s) 310 and/or processor 340, which generates a processed baseband signal by filtering, decoding, and/or digitizing the baseband or IF signal. The RX processing circuitry sends the processed baseband signal to the speaker 330 (such as for voice data) or is processed by the processor 340 (such as for web browsing data).

TX processing circuitry in the transceiver(s) 310 and/or processor 340 receives analog or digital voice data from the microphone 320 or other outgoing baseband data (such as web data, e-mail, or interactive video game data) from the processor 340. The TX processing circuitry encodes, multiplexes, and/or digitizes the outgoing baseband data to generate a processed baseband or IF signal. The transceiver(s) 310 up-converts the baseband or IF signal to an RF signal that is transmitted via the antenna(s) 305.

The processor 340 can include one or more processors or other processing devices and execute the OS 361 stored in the memory 360 in order to control the overall operation of the UE 116. For example, the processor 340 could control the reception of DL channel signals and the transmission of UL channel signals by the transceiver(s) 310 in accordance with well-known principles. In some embodiments, the processor 340 includes at least one microprocessor or microcontroller.

The processor 340 is also capable of executing other processes and programs resident in the memory 360. The processor 340 can move data into or out of the memory 360 as required by an executing process. In some embodiments, the processor 340 is configured to execute the applications 362 based on the OS 361 or in response to signals received from gNBs or an operator. The processor 340 is also coupled to the I/O interface 345, which provides the UE 116 with the ability to connect to other devices, such as laptop computers and handheld computers. The I/O interface 345 is the communication path between these accessories and the processor 340.

The processor 340 is also coupled to the input 350, which includes for example, a touchscreen, keypad, etc., and the display 355. The operator of the UE 116 can use the input 350 to enter data into the UE 116. The display 355 may be a liquid crystal display, light emitting diode display, or other display capable of rendering text and/or at least limited graphics, such as from web sites.

The memory 360 is coupled to the processor 340. Part of the memory 360 could include a random-access memory (RAM), and another part of the memory 360 could include a Flash memory or other read-only memory (ROM).

Although FIG. 3 illustrates one example of UE 116, various changes may be made to FIG. 3. For example, various components in FIG. 3 could be combined, further subdivided, or omitted and additional components could be added according to particular needs. As a particular example, the processor 340 could be divided into multiple processors, such as one or more central processing units (CPUs) and one or more graphics processing units (GPUs). In another example, the transceiver(s) 310 may include any number of transceivers and signal processing chains and may be connected to any number of antennas. Also, while FIG. 3 illustrates the UE 116 configured as a mobile telephone or smartphone, UEs could be configured to operate as other types of mobile or stationary devices.

FIG. 4 illustrates a high level diagram of an overall setup for AI/ML empowered high order modulation according to various embodiments of this disclosure. The embodiment of FIG. 4 is for illustration only. Other embodiments of the system 400 could be used without departing from the scope of this disclosure.

FIG. 4 illustrates the overall setup of an end-to-end system 400 with a bit-wise autoencoder 401 ML framework for a neural network (NN)-mapper 402 and a NN-demapper 403, with a signal transmission channel 404 in between. Bits 405 are received by a low density parity check (LDPC) encoder 406, the output of which is passed to bit-wise autoencoder 401. The output of bit-wise autoencoder 401 is received by a LDPC decoder 407.

Let n be the number of binary bits 405 used per channel then bit vectors b∈{0,1}ⁿ are considered as inputs, which are mapped to a complex symbol x∈ by the NN-mapper 402. The NN-mapper 402 can be a mapping function ƒθ:{0,1}^m→, with trainable parameters Θ₁ and where m is a value ≥n. For example, in case of modulations with modulation symbol alphabet size 256 (so called “256-ary” modulation), n becomes 8 and a bit vector consisting of 8 binary bits are mapped to a modulation symbol.

The complex symbol is then sent over the channel, for example, additive white Gaussian noise (AWGN) static channel and at the receiver, the received symbol y∈ can be mapped to a real vector comprising the log likelihood ratios (LLRs) by the NN-demapper 403, i.e., g_θ: →l, where l∈ⁿ resent the LLRs and Θ₂ are the trainable parameters. The LLRs can indicate how likely the respective bits composing the received modulation symbol is either 0 or 1.

FIGS. 5A and 5B illustrate high level diagrams of the encoder and decoder, respectively, for a bitwise autoencoder architecture for AI/ML empowered high order modulation according to various embodiments of this disclosure. The embodiment of FIGS. 5A and 5B is for illustration only. Other embodiments of the encoder 500 and decoder 510 could be used without departing from the scope of this disclosure.

FIGS. 5A and 5B are exemplary embodiments of the neural network architecture for NN-mapper 402 and NN-demapper 403 illustrated in FIG. 4. An embodiment of the NN-mapper 402 consists of an embedding layer 501, followed by a series 502. 503 of dense layers with varied input/output dimensions specific to the modulation order. In the embodiment, every dense layer is followed by batch normalization (BN) and exponential linear unit (ELU) activation layer, where ELU activation function is given as

$\mathrm{ELU}\left(z\right)=\{\begin{array}{cc}z,& z>0\\ \alpha \left(e^z-1\right),& z\le 0\end{array}$

In the embodiment, the output of the last dense layer 503 of the NN-mapper 402 is a two-dimensional real vector corresponding to in-phase and quadrature phase values of the complex baseband symbol. The final layer 504 of the NN-mapper 402 is a power normalization layer that ensures _x[|x|²]=1.

The NN-demapper 403 also consists of a series 511, 512, 513 of dense layers with different input/output dimensions followed by (for 511 and 512 batch normalization and ELU activation layers. The final output of the NN-demapper 403 is the n-dimensional real vector l∈ⁿ, i.e., n logits (one logit per bit). Probabilities over n bits can be calculated by applying the sigmoid function,

$\sigma \left(z\right)=\frac{1}{1+e^{-z}},$

elementally to the corresponding logits. Logits can correspond to LLRs since the inverse of sigmoid function is the log-likelihood ratio, thus the output of the NN-demapper 403 can be considered as LLRs.

In [1], it is shown that bit-wise mutual information that is the achievable rate in bit-metric decoding (BMD) receivers is inversely related to the BCE, i.e., minimizing the BCE maximizes the achievable rate. BCE with logits BCE_logits(Θ₁, Θ₂) that combines the sigmoid function and binary cross entropy can be considered as a part of loss function. Let B_n represent all 2ⁿ bit vectors of length n, then the BCE can be estimated as follows:

${\mathrm{BCE}}_{\mathrm{logits}}\left({\Theta }_1,{\Theta }_2\right)\sim -\frac{1}{❘B_n❘}\sum _{b\in B_n}\sum _{j=1}^n{b}_j\log \left[\sigma \left(l_j\right)\right]+\left(1-b_j\right)\log \left[1-\sigma \left(l_j\right)\right],$

where l_j, b_j corresponds to the j^th element l, b vectors, respectively, and σ(·) Is the sigmoid function.

Well performing modulations tend to have symmetries among the constellation points from four different quadrants comprising the 2-D constellation space, and in an exemplary embodiment, a loss function QS(Θ₁) given below to reflect the quadrant symmetry is incorporated as a part of the loss function:

$\mathrm{QS}\left({\Theta }_1\right)=1-\exp \left[-\frac{{{\Sigma }_{}\left(x^{\left(r\right)}\right)}^2+{\left(x^{\left(i\right)}\right)}^2}{2\eta }\right],$

where x=(x^(r), x⁽ⁱ⁾)∈ represent the in-phase and quadrature phase values of the constellation point, i.e., the real and imaginary parts of the complex symbol x, and η is the Gaussian variance.

The set B_n represents all possible 2ⁿ bit vectors, that corresponds to 2ⁿ complex symbols x, i.e., the constellation points. In an exemplary embodiment, these points are made to be quadrant symmetric, by minimizing the sum of squares of real and imaginary values by using the above function.

The loss function for end-to-end training can be an additive sum of the BCE and the quadrant symmetry loss term QS(Θ₁) scaled with a Lagrangian constant λ as shown below:

L(Θ₁,Θ₂)=BCE_logits(Θ₁,Θ₂)+λQS(Θ₁),

which is referred to as quadrant symmetry-Lagrangian (QSL) method in this embodiment.

Training can be done using Adam Optimizer with step-wise decreasing learning rates at different SNR values. In one embodiment the auto encoder is trained at two different training SNR values, one lower and one higher each can correspond to relatively a higher code rate and lower code rate scenarios. The resulting two different constellations for modulation orders of 64/256/1024 are evaluated using LDPC encoder and decoder and comparing the resulting coded bit-error-rate (BER) with baseline models of uniform constellations and non-uniform broadcasting constellations from Advanced Television Systems Committee (ATSC) and Digital Video Broadcasting (DVB) standards.

Modulation Schemes for 64 Modulation Order

An embodiment of the neural network architecture and parameters for 64 modulations are as in TABLE 1.

For 64 modulation order, in an exemplary embodiment the autoencoder is trained at a training SNR of 9 dB and 16 dB ratio of symbol energy to noise power spectral density (Es/N0) for code rates of ⅓ and 11/15 respectively. The parameters of an embodiment of the encoder and decoder layers are shown in TABLE 1.

TABLE 1 Detailed Neural Network parameters for 64-ary constellations BATCH SIZE 128 TOTAL NO. OF EPOCHS 30 NO. OF STEPS 5000 EPOCH MILESTONES [5, 10, 20] LEARNING RATES [4e−4, 4e−5, 1e−5] λ [0.001, 0.001, 0.05] η [1000, 1000, 300] ENCODER (LAYER, OUTPUT DIM) Embedding (128) Dense (128) Dense (64) Dense (32) Dense (2) DECODER (LAYER, OUTPUT DIM) Dense (32) Dense (64) Dense (64) Dense (6)
The encoder has an embedding layer with output dimension of 128 followed by 4 dense layers with decreasing output dimensions, and the decoder has 4 dense layers, each of the dense layers is followed by batch normalization and an ELU activation layer as mentioned before.

The training can be done by focusing more or less on reducing one or both of the BCE term and quadrant symmetric (QS) terms. In an exemplary embodiment, the training is focused on reducing the BCE loss term, by starting with lower values for λ=0.001, the Lagrangian constant for the QS loss term and higher values for variance η=1000 and changing those values after few epochs. For example, λ, η may be updated to 5×10⁻² and 300, respectively, after 20 epochs.

In an exemplary embodiment, training is done for 30 epochs with 5000 steps per epoch for a batch size of 128 for a starting learning rate of 4×10⁻³ that decreases by a factor of 0.01 after every 5 epochs.

64-Ary Constellation for Lower Code Rate

For relatively low code rates, which can be useful in low SNR scenarios, an embodiment of the 64-constellation in FIG. 6 is close to circular in shape, with 16 constellation points placed on each of the four concentric circular shapes of different radii. The shape may not be perfectly circular, however, but instead may be nearly optimal for the loss function at the trained SNR. The distance between two concentric circular shapes may not be same, r₁₂, r₂₃, and r₃₄ may all different values, where r_ij denotes the distance between i^th, j^th concentric circular shapes.

On each of the circular shapes, 16 points are placed in 8 pairs with angular separation between two points in a pair being θ_i and angular separation between two pairs being α_i as illustrated in FIG. 6, where θ_i and α_i correspond to angular separations on i^th circular shape with 1^st circular shape being the outermost one.

The angular separation between points in a pair is smaller than angular separation between pairs, i.e., θ_i<α_i, ∀i∈{1,2,3,4}. Depending on the target SNR of the modulation, e.g., as the target SNR increases, θ_i and α_i can become the same, that is, the angular separation between the neighboring constellation points on a circular shape of a radius becomes equal.

The angular separation between the two points in a pair, θ₁, is higher for outer shapes and lower for inner shapes, i.e., θ₁>θ₂>θ₃>θ₄, as illustrated in FIG. 6. Thus, each pair of the points on the inner most circular shape come very close to each other.

Any angular rotation of the constellations around the center presented in this disclosure results in an equivalent constellation and leads to the same or similar effects.

64-Ary Constellation Description for Higher Code Rate

For higher code rates, which can be useful in high SNR scenarios, an embodiment of the 64-constellations in FIG. 7 is almost circular in shape for the outer three concentric shapes, with 16 points almost equally placed on each of the two outermost concentric circles of different radii and another set of 16 points placed on a third concentric shape which seems in between circle and ellipse. The remaining 16 points are placed on two inner shapes which seems to be close to quadrilateral, with 12 points on the outer shape and 4 on the inner one.

Coded BER Performance

In an exemplary embodiment, the NN-mapper and NN-demapper were trained at two different training SNR values, each resulting in an optimal constellation for a lower and higher code rate. The coded-BER of the modulations were evaluated for code block size of 2400 bits.

The 64-ary constellations from NN have slightly better performance than ATSC, especially in lower coded-BER regime and have better performance than DVB and uniform-QAM both in terms of coded BER for both code rates as illustrated in FIG. 8. Thus, in this example, the non-uniform constellations obtained from our NN effectively outperforms all existing schemes.

Modulation Schemes for 256 Modulation Order

For 256 modulation order, in an exemplary embodiment the autoencoder is trained at a SNR of 18 dB and 22 dB Es/N0 for code rates of ⅔ and ⅘ respectively. The parameters of an embodiment of the encoder and decoder layers are shown in TABLE 2.

TABLE 2 Detailed Neural Network parameters for 256-ary constellations BATCH SIZE 512 TOTAL NO. OF EPOCHS 90 NO. OF STEPS 10000 EPOCH MILESTONES [30, 30, 30] LEARNING RATES [4e−4, 2e−4, 1e−5] λ [0.001, 0.001, 0.05] η [1000, 1000, 300] ENCODER (LAYER, OUTPUT DIM) Embedding (128) Dense (128) Dense (64) Dense (32) Dense (32) DECODER (LAYER, OUTPUT DIM) Dense (64) Dense (128) Dense (128) Dense (8)

The encoder has an embedding layer with output dimension of 128 followed by 4 dense layers with decreasing output dimensions, and decoder has 4 dense layers, each of the dense layers is followed by batch normalization and an ELU activation layer as mentioned before.

The training can be done by focusing more or less on reducing one or both of the BCE term and QS terms. In an exemplary embodiment, the training is focused on reducing the BCE loss term, by starting with lower values for λ=0.001, the Lagrangian constant for QS loss term and higher values for variance η=1000 and changing them after few epochs. For example, updating λ,η to 5×10{circumflex over ( )}(−2) and 300 respectively after 60 epochs.

In an exemplary embodiment, training is done for 90 epochs with 10000 steps per epoch for a batch size of 512 and a starting learning rate of 4×10⁻³ that decreases to 4×10⁻⁴, 2×10⁻⁴ and 1×10⁻⁵ after every 30 epochs.

FIGS. 9A and 9B illustrate examples of 256-ary constellations for a higher code rate of ⅘. For higher code rates, which can be useful in high SNR scenarios, the two embodiments of 256-ary constellations shown in FIGS. 9A and 9B are close to circular in shape, with 32 points placed on each of the 7 outer concentric circular shapes of different radii. In the constellation shown in FIG. 9A, the two dashed-dotted circles 901, 902 compare with the 2nd and 5th circular constellation shapes, respectively (starting with numbering the outermost constellation shape as the 1st constellation shape). Circles 901, 902 indicate the degree of circularity for the corresponding constellation shapes. The 5th circular constellation (circle 902) is less circular than the 2nd circular constellation (circle 901). In general, with a decrease in the radius, the shape becomes less circular and more elliptic. The changes in the constellation shape can enable decrease in the modulation symbol detection error events, especially for cases where a smaller signal energy is used for the modulation symbols on the inner shapes as compared to the signal energy for modulation symbols on outer shapes. In case of the constellation shown in FIG. 9B, the two shapes overlaid by the dashed-dotted circles 903, 904 are closer to circles than the ones in FIG. 9A.

In both of the constellations of FIGS. 9A and 9B, the angular separation between the neighboring constellation points on the outer-most circular shape is almost equal—that is, θ₁=α₁. In case of the other six concentric shapes inside of the outer-most circular shape, θ₁ (which denotes the angular separation between two points in a pair in the constellation) gradually becomes smaller than α₁ (which denotes the angular separation between two points from neighboring pairs), with decreasing radius of the shapes. That is, the angular separation between the two points in a pair is higher for outer shapes and lower for inner shapes, which results in (for example) θ₅<θ₂ and θ₄<θ₁, respectively, in FIG. 9A. On the 7th circular shape, with the smallest radius among the seven outer circular shapes, θ_i becomes very small, and the constellation points in a pair almost touch each other as seen in FIGS. 9A and 9B

The Euclidean distance between the constellation points on the neighboring circular shapes is the largest between the constellation points on the two outermost circular shapes, which are the 1st and 2nd constellation shapes separated by distance denoted as d₁ in FIGS. 9A and 9B. The distance decreases for the constellation points on the circular shapes closer to the center. That is, the distance between the constellation points on the 2nd and 3rd constellation shapes, denoted as d₂ in FIGS. 9A and 9B, is shorter than d₁, and further decreases as the circular shapes get closer to the center.

For the both constellations shown in FIGS. 9A and 9B, 32 constellation points are located inside of the inner-most (7^th) circular shape. In case of the constellation in FIG. 9A, two quadrilateral shapes result, with 24 points on the outer quadrilateral and 8 on the inner quadrilateral. Each of the 16 dots in the two quadrilateral shapes actually reflects two constellation points located on slightly different locations. Similarly, in case of the constellation in FIG. 9B, the remaining 32 constellation points result in two quadrilateral shapes and each of the 16 dots in the two quadrilateral shapes actually correspond to two constellation points located on slightly different locations. Compared to the quadrilateral shapes in FIG. 9A, the width of the outer quadrilateral is narrower and accordingly the eight constellation points on the inner quadrilateral, seen as four dots in FIG. 9B, are located quite close to the constellation points on the outer quadrilateral on the left and right sides.

For relatively low code rates, which can be useful in low SNR scenarios, an embodiment of the 256-ary constellation shown in FIG. 10 contains shapes close to quadrilateral, especially in the inner region close to the center, rather than taking circular shapes as in the embodiments shown in FIGS. 9A and 9B. In the inner region, the constellation points are located along the concentric quadrilateral with similar lengths on each side, close to a square. The inner most quadrilateral 1001 has 4 points, followed by a quadrilateral 1002 with 12 points, a quadrilateral 1003 with 20 points, a quadrilateral 1004 with 28 points, a quadrilateral with 36 points, a quadrilateral with 44 points, and with outermost quadrilateral having 52 points. The sides of the quadrilateral may be straight or may have curvature like concave/convex with curvature being more prominent on two opposites than the curvature on remaining sides. The curvature is more prominent for outer quadrilaterals than inner quadrilaterals. The points may not be placed exactly on the curvature and may have some small deviations.

The remaining outermost 50 points are almost placed along the curvatures, with 16 points on each of the more prominent curvature sides and 14 points on each less prominent curvature side. The 16 points are placed on almost 3 almost concentric concave shaped curvatures with 8 points on the innermost curvature, followed by 6 points and 2 points. The 14 points are places on 2 almost concentric concave shaped curvatures, with 10 points on inner most curvature and 4 points on the outermost curvature.

FIG. 11 illustrate simulation results comparing the coded BER plotted as a function of ratio of bit energy to noise power spectral density (Eb/N0) for 256-ary constellations from NN with ATSC, DVB and uniform QAM. In an exemplary embodiment, the NN-mapper and NN-demapper are trained at two different training SNR values, each resulting in an optimal constellation for a lower and higher code rate. The coded-BER is then evaluated for a code block of size of 3000 bits.

The 256-ary constellations from NN 1101 have slightly better performance than the 256-ary constellations from ATSC 1102, and a better performance than the 256-ary constellations from DVB and uniform-QAM 1103, both in terms of coded BER for both code rates as illustrated in FIG>0.11. Thus, in this example, the non-uniform constellations obtained from NN effectively outperforms all existing schemes.

Modulation Schemes for 1024 Modulation Order

For 1024 modulation order, in an exemplary embodiment the autoencoder is trained at a SNR of 23 dB and 28 dB Es/N0 for code rates of ⅗ and ⅘ respectively. The parameters of an embodiment of the encoder and decoder layers are shown in TABLE 3:

TABLE 3 Detailed Neural Network parameters for 1024-ary constellations BATCH SIZE 1024 TOTAL NO. OF EPOCHS 50 NO. OF STEPS 10000 EPOCH MILESTONES — LEARNING RATES 4e−4 λ 0.001 η 1000 ENCODER (LAYER, OUTPUT DIM) Embedding (4096) Dense (4096) Dense (2048) Dense (2) DECODER (LAYER, OUTPUT DIM) Dense (64) Dense (128) Dense (128) Dense (10)
The encoder has an embedding layer with output dimension of 4096 followed by 4 dense layers with decreasing output dimensions, and the decoder has 4 dense layers, with each of the dense layers followed by batch normalization and an ELU activation layer as mentioned before.

The training can be done by focusing more or less on reducing one or both of the BCE term and QS terms. In an exemplary embodiment, the training is focused on reducing the BCE loss term, by starting with lower values for λ=0.001, the Lagrangian constant for quadrant symmetric (QS) loss term and higher values for variance η=1000 and changing the values after few epochs. For example, updating λ, η to 5×10⁻² and 300, respectively, after 60 epochs.

In an exemplary embodiment, training is done for 100 epochs with 15000 steps per epoch for a batch size of 2048 and a starting learning rate of 4×10⁻³ that decreases to 4×10⁻⁴ after every 50 epochs.

1024-Ary Constellation Description for Higher Code Rate

For higher code rates, which can be useful in high SNR scenarios, an embodiment of the 1024-ary constellation is shown in FIG. 12, which is close to circular in shape, with 64 points placed on each of the 14 outer concentric circular shapes 1200 of different radii.

The Euclidean distance between the constellation points on the neighboring circular shapes is the largest between the ones on the outer-most circular shapes (which are the 1^st and 2^nd ones), denoted as d₁ in FIG. 12. The distance decreases for the constellation points on the circular shapes closer to the center. That is, the distance between the constellation points on the 2^nd and 3^rd circular shape, denoted as d₂ in FIG. 12, is shorter than d₁, and further decreases as the circular shapes get closer to the center.

In the constellation shown in FIG. 12, the two dashed-dotted circles 1201, 1202 compares with the 1^st and 6^th circular constellation shapes, starting from the outer-most one as the 1^st, and indicates how circular the corresponding constellation shapes are. The 6^th constellation shape is less circular than the 1^st one and, with decreases in the radius, the constellation shapes become less circular and more elliptic. The changes in the constellation shape can enable decrease in the modulation symbol detection error events, especially for cases where a smaller signal energy is used for the modulation symbols on the inner constellation shapes as compared to the symbols on outer constellation shapes.

In the constellation of FIG. 12, the angular separation between the neighboring constellation points on 13 out of 14 concentric circular shapes 1200 is almost equal, that is θ₁=α₁. In case of the innermost concentric circle 1203 of the 14 constellation shapes 1200, the pairs of points maintain almost equal distance and are in almost a zig-zag fashion intersecting the circular shape, as shown by the connecting lines 1204.

The remaining 128 points are located inside of the innermost (14th) circular shape 1203, with 32 points placed with similar angular distance on two almost circular shapes 1201, 1202, 32 points on almost octagonal shape (with 8 points on each “side”), and the innermost 24 and 8 points placed on almost concentric polygonal shapes.

1024-Ary Constellation Description for Lower Code Rate

For relatively low code rates, which can be useful in low SNR scenarios, an embodiment of the 1024-constellation such at that depicted in FIG. 13 is close to concentric polygonal shapes, with constellation shapes that may be a quadrilateral for at least inner most points. The innermost points in the concentric polygonal shapes are placed in way such that two points are almost in the same location, with increasing separation as the constellation shapes proceed outward.

The sides of the polygons when moving outward may be straight or may have curvature (e.g., concave/convex), with curvature being more prominent on two of the opposite sides than the curvature on remaining sides. The curvature may be more prominent for outer polygons than for inner quadrilaterals. The points may not be placed exactly on the curvature, and may have some small deviations.

Quadrant Symmetric Constraint (QSC)

A desirable property of four-quadrant symmetry for the constellations can be introduced as a constraint. In an exemplary embodiment, the set of all possible 10-bit vectors {0,1}¹⁰ is split into two parts, one with 8 bits and other with 2 bits. The 8 bit vectors, b⁽¹⁾∈{0,1}¹⁰, are then fed in to NN-mapper to be mapped to 256 points in the first quadrant, i.e., positive values. The output of the NN-mapper is positive by using activation functions. An example for such activation function is a sigmoid activation function. The remaining 2-bit vectors b⁽²⁾∈{0,1}² can be used to assign sign to the 256 points resulting in a quadrant symmetric 1024 points.

The sign can be assigned by various operations and one such operation could be as follows:

x=(−2·b⁽²⁾+1)·{circumflex over (x)},

where 1 denotes a vector of ones and {circumflex over (x)} corresponds to the output of NN-mapper, i.e., all positive (I, Q) pairs in first quadrant.

FIG. 14 illustrates an architecture for a QSC-autoencoder according to various embodiments of this disclosure. The embodiment shown in FIG. 14 is for illustration only. Other embodiments of a QSC-NN-mapper could be used without departing from the scope of this disclosure.

The QSC-autoencoder 1400 operates on a set of b_i vectors each of n bits, and partitions those vectors into a first subset b_i⁽¹⁾∈{0,1}^n-2 and a second set b_i⁽²⁾∈{0,1}². The first vector subset b_i⁽¹⁾∈{0,1}^n-2 is passed to NN-mapper 1401, the output of which is operated on by sigmoid activation function 1402 to generate {circumflex over (x)}. The second vector subset b_i⁽²⁾∈{0,1}² is one input, and {circumflex over (x)} is another input, for operation (−2·b⁽²⁾+1)·{circumflex over (x)} 1403. The output of that operation 1403 is received by power normalization function 1404, which produces the set of signed values x for constellation points.

For 1024 modulation order with the quadrant symmetry constraint, in an exemplary embodiment the autoencoder is trained at a SNR of 24 dB and 28 dB Es/N0 for code rates of ⅗ and ⅘ respectively. The parameters of an embodiment of the encoder and decoder layers are shown in TABLE 4:

TABLE 4 Detailed Neural Network parameters for 1024-ary constellations with QSC BATCH SIZE 1024 TOTAL NO. OF EPOCHS 80 NO. OF STEPS 15000 EPOCH MILESTONES [20, 40, 60] LEARNING RATES [4e−4, 4e−5, 4e−6] ENCODER (LAYER, OUTPUT DIM) Embedding (4096) Dense (2048) Dense (1024) Dense (512) Dense (2) DECODER (LAYER, OUTPUT DIM) Dense (64) Dense (128) Dense (256) Dense (256) Dense (256) Dense (10)

The encoder has an embedding layer with output dimension of 4096 followed by 4 dense layers with decreasing output dimensions, and the decoder has 6 dense layers, with each dense layer followed by batch normalization and an ELU activation layer as mentioned before.

In an exemplary embodiment, training is done for 80 epochs with 15000 steps per epoch for a batch size of 1024 and a starting learning rate of 4×10⁻³, which decreases by a factor of 0.1 after every 20 epochs.

1024-Ary Constellation Description for Higher Code Rate from QSC

For higher code rates, which can be useful in high SNR scenarios, one embodiment of the 1024-ary constellation is shown in FIG. 15, which is close to circular in shape, with 64 points placed on each of the 14 outer concentric, generally circular shapes 1500 of different radii.

The Euclidean distance between the constellation points on the neighboring circular shapes is the largest between the ones on the outer-most circular shapes, which are the 1st and 2nd ones, denoted as d₁ in FIG. 15. The distance decreases for the constellation points on the circular shapes closer to the center. That is, the distance between the constellation points on the 2^nd and 3^rd circular shape, denoted as d₂ in FIG. 15, is shorter than d₁, and further decreases as the circular shapes get closer to the center.

The dashed-dotted shapes 1501, 1502, 1503 and 1504 compare with inner constellation shapes, starting from the outer-most (1^st) constellation shape and ending with the innermost (6^th) constellation shape, and indicates how circular the corresponding constellation shapes are. The 6^th constellation shape is less circular than the 1^st constellation shape, and with a decrease in the radius, the shape becomes less circular and more elliptic. The changes in the constellation shape can enable decrease in modulation symbol detection error events, especially for cases that a smaller signal energy is used for the modulation symbols on the inner shapes as compared to the modulation symbols on outer shapes.

The angular separation between the neighboring constellation points on 13 out of 14 concentric circular shape is almost equal, that is θ₁=α₁. In case of the inner concentric circles, the pairs of points maintain almost equal distance and are in almost a zig-zag fashion intersecting the circular shape as highlighted by the lines 1505 in FIG. 15.

The remaining 128 points are placed on almost 6 concentric octagonal shapes, with 40 points placed on outermost octagonal shape with alternate sides having 6 and 4 points each side, followed by three concentric octagonal shapes having 24 points with alternate sides having 4 and 2 points each side and with innermost two octagonal shapes having 8 points each.

1024-Ary Constellation Description for Lower Code Rate from QSC

For lower code rates, which can be useful in low SNR scenarios, one embodiment of the 1024-ary constellation is shown in FIG. 16, which is close to circular in shape and has 64 points placed on each of the 10 outer concentric circular shapes of different radii.

The Euclidean distance between the constellation points on the neighboring circular shapes is the largest between the constellation shapes on the outer-most circular shapes, which are the 1^st and 2^nd constellation shapes, is denoted as d₁ in FIG. 16. The distance decreases for the constellation points on the constellation shapes closer to the center. That is, the distance between the constellation points on the 2^nd and 3^rd constellation shapes, denoted as d₂ in FIG. 16, is shorter than d₁, and further decreases as the constellation shapes get closer to the center.

The dashed-dotted circles compare the 1^st and 7^th constellation shapes 1601, 1602, starting from the outer-most one as the 1^st, and indicates how circular the corresponding constellation shapes are. The 6^th constellation shape is less circular than the 1^st constellation and, with a decrease in the radius, the shape becomes less circular and more elliptic. The changes in the constellation shape can enable decrease in the modulation symbol detection error events, especially for cases that a smaller signal energy is used for the modulation symbols on the inner shapes compared to the modulation symbols on outer shapes.

The angular separation between the neighboring constellation points on 6 out of 10 constellation shape is almost equal, that is θ₁=α₁. Along with the shapes becoming more elliptical, the angular separation θ₁ between pair of points is no longer same for all pairs of points. The separation of the points on the elongated curvature of each inner shape is less that the pair of points on shorter curvature side, to an extent that the points are almost at same location as can be seen by points on dashed-dotted ellipse 1503 in FIG. 16.

The remaining points are placed on almost concentric elliptical and/or polygonal shapes, with two points almost sharing the same location.

Rectangular Structure Constraint (RSC)

In this embodiment, a rectangular shape for the constellation map can be introduced as a constraint. In an exemplary embodiment, this is done by splitting the 10-bit vector into two halves of 5-bit vectors and have each of those vectors go through an NN-mapper, as illustrated in FIG. 17.

The RSC-autoencoder 1700 operates on a set of b_i vectors n bits, and partitions those vectors into a first subset

$b_i^{\left(1\right)}\in {\left\{0,1\right\}}^{\frac{n}{2}}$

and a second set

$b_i^{\left(2\right)}\in {\left\{0,1\right\}}^{\frac{n}{2}}.$

The first vector subset is passed to NN-mapper 1701 and the second vector subset is passed to NN-mapper 1702. The exemplary embodiment of FIG. 17 contemplates using the same network weights and architecture for both NN-mappers 1701, 1702. The output of each NN-mapper is a single real value, where one value corresponds to in-phase (I) and other corresponds to the quadrature phase (Q). The outputs of the NN-mappers 1701, 1702 are received by power normalization function 1703, which produces the set of signed values x for constellation points.

The parameters of an exemplary embodiment of the encoder and decoder layers for 1024 modulation order with the rectangular symmetry constraint are shown in TABLE 5:

TABLE 5 Detailed Neural Network parameters for 1024-ary constellations with RSC BATCH SIZE 1024 TOTAL NO. OF EPOCHS 10 NO. OF STEPS 10000 EPOCH MILESTONES [5] LEARNING RATES [4e−4] λ [0.001] η [1000] ENCODER (LAYER, OUTPUT DIM) Embedding (2048) Dense (2048) Dense (512) Dense (256) Dense (2) DECODER (LAYER, OUTPUT DIM) Dense (64) Dense (128) Dense (256) Dense (256) Dense (256) Dense (10)

FIGS. 18A and 18B illustrate 1024-ary constellations obtained by NN-RSC. FIG. 18A illustrates the constellations for a higher code rate of ⅘, while FIG. 18B illustrates the constellations for a lower code rate of ⅗. One example of the 16-positive x coordinates of 1024-ary constellation obtained from RSC for the higher code rate of ⅘ can be (1.3347, 1.1878, 1.0626, 0.9504, 0.8462, 0.7523, 0.6629, 0.5805, 0.5035, 0.4297, 0.3594, 0.2916, 0.2239, 0.1597, 0.0937, 0.0328). One example of the 16-positive x coordinates of 1024-ary constellation obtained from RSC for lower code rate of ⅗ can be (0.0601, 0.0605, 0.1794, 0.1796, 0.3027, 0.3039, 0.4309, 0.4375, 0.5676, 0.5905, 0.7189, 0.7866, 0.9201, 1.0561, 1.2280, 1.4486).

Simulation Results: Coded BER for 1024-Modulation Schemes

FIG. 19 illustrates simulation results comparing the coded BER of 1024-ary constellations from NN and NN-QSC with ATSC and uniform QAM. As illustrated, embodiments of 1024-constellations from various NN architectures (NN-QSL 1905, 1915; NN-RSC 1904, 1914; and NN-QSC 1903, 1913) outperform or closely match a non-uniform constellation from ATSC 1902, 1912, and outperform a constellation from uniform QAM 1901, 1911 by a significant margin, at lower/higher code rates of ⅗ and ⅘.

Bit-to-Symbol Mapping for all Modulation Orders

The non-uniform constellations described above may not usually form a grid as in a conventional QAM, and finding the optimal labeling is a combinatorial problem with 2ⁿ! possibilities. Using neural network can provide with optimal bit-to-symbol mapping. An exemplary bit-to-symbol mapping for the embodiments of 64/256/1204 constellations are listed below.

The following tables provide with mapping from binary bits associated with integers in the column labeled mapping with locations denoted by the complex numbers that denotes in-phase and quadrature phase values.

For modulation order of 64, the mapping is from binary bits of size 6 (integers from 0-63) to constellation points. For 256 and 1024 modulation orders, the mapping is from 8 binary bits (integers from 0-256) and 10 binary bits (integers from 0-1023) respectively.

Bit-to-Symbol Mapping for 64-Modulation Order Schemes

An example of the bit-to-symbol mapping for 64-ary non-uniform constellations for code rates ⅓ and 11/15 is given in TABLE 6:

TABLE 6 An example of the bit-to-symbol mapping for 64-ary non-uniform constellations from NN Mapping Code Rate, r = 1/3 Code Rate, r = 11/15 0 (−0.2097 + 0.3403j)  (0.4907 + 0.0364j) 1 (−0.8372 + 1.2398j)  (0.733 + 0.0826j) 2  (0.1936 + 0.3481j)  (1.4016 + 0.2667j) 3  (0.796 + 1.2854j)  (1.0335 + 0.1572j) 4 (−0.1939 + 0.3283j) (−0.0631 − 0.4863j) 5 (−0.3343 + 1.4425j)  (−0.124 − 0.7262j) 6  (0.1786 + 0.3361j) (−0.3216 − 1.3896j) 7  (0.2682 + 1.4537j)  (−0.209 − 1.0221j) 8  (−0.194 − 0.3509j)  (0.3853 − 0.1957j) 9 (−0.7978 − 1.2857j)  (0.7104 − 0.2442j) 10  (0.2062 − 0.3392j)  (1.4333 − 0.2849j) 11  (0.8574 − 1.2622j)  (1.0537 − 0.2444j) 12 (−0.1782 − 0.3381j)  (0.1741 − 0.3976j) 13 (−0.2735 − 1.461j)   (0.2082 − 0.7241j) 14  (0.1898 − 0.3298j)  (0.223 − 1.4431j) 15  (0.3312 − 1.4431j)  (0.1977 − 1.0622j) 16 (−0.3204 + 0.5482j)  (0.0638 + 0.4865j) 17 (−0.5788 + 0.9226j) (0.1225 + 0.726j) 18  (0.298 + 0.5581j)  (0.335 + 1.386j) 19 (0.5472 + 0.945j)  (0.2155 + 1.0211j) 20 (−0.2534 + 0.5721j) (−0.4897 − 0.0399j) 21 (−0.2862 + 1.0536j) (−0.7342 − 0.0864j) 22  (0.2353 + 0.5805j) (−1.4092 − 0.2568j) 23  (0.2491 + 1.0588j) (−1.0349 − 0.1617j) 24 (−0.2988 − 0.5626j) (−0.1738 + 0.3927j) 25 (−0.5412 − 0.9449j) (−0.2068 + 0.7201j) 26  (0.317 − 0.5426j) (−0.2136 + 1.4405j) 27  (0.5812 − 0.9185j)  (−0.191 + 1.0578j) 28 (−0.2322 − 0.5813j) (−0.3854 + 0.1923j) 29 (−0.2367 − 1.0684j) (−0.7125 + 0.2403j) 30  (0.2575 − 0.5657j) (−1.4237 + 0.2957j) 31  (0.2906 − 1.0509j) (−1.0473 + 0.2465j) 32  (−0.352 + 0.1938j)  (0.3653 + 0.1894j) 33 (−1.2881 + 0.8197j)  (0.6174 + 0.3805j) 34 (0.3433 + 0.209j)  (1.196 + 0.7683j) 35  (1.2595 + 0.8631j)  (0.8805 + 0.5471j) 36 (−0.3413 + 0.1757j) (−0.2085 − 0.3501j) 37 (−1.4694 + 0.2835j) (−0.4147 − 0.5984j) 38  (0.3344 + 0.1928j) (−0.8177 − 1.1683j) 39  (1.4572 + 0.3276j) (−0.5933 − 0.8561j) 40 (−0.3444 − 0.2082j)  (0.171 − 0.0231j) 41  (−1.251 − 0.8582j)  (0.6615 − 0.4969j) 42 (0.3506 − 0.192j)  (1.2448 − 0.8446j) 43  (1.2861 − 0.7998j)  (0.9254 − 0.6516j) 44 (−0.3322 − 0.1903j)  (0.0127 − 0.1724j) 45 (−1.4674 − 0.3372j)  (0.4644 − 0.6824j) 46  (0.3391 − 0.1761j)  (0.7842 − 1.2815j) 47  (1.4689 − 0.2864j)  (0.606 − 0.9536j) 48 (−0.5618 + 0.2961j)  (0.2077 + 0.3502j) 49 (−0.9392 + 0.546j)   (0.4094 + 0.5995j) 50  (0.548 + 0.3187j)  (0.8246 + 1.1648j) 51  (0.9214 + 0.5806j)  (0.5941 + 0.8515j) 52 (−0.5842 + 0.23j)  (−0.3639 − 0.1896j) 53 (−1.0695 + 0.2436j) (−0.6211 − 0.3821j) 54  (0.5732 + 0.2577j) (−1.2031 − 0.7729j) 55 (1.0582 + 0.287j) (−0.8821 − 0.5525j) 56  (−0.555 − 0.3223j)  (−0.014 + 0.1707j) 57 (−0.9227 − 0.5751j) (−0.4624 + 0.6764j) 58  (0.5616 − 0.2961j) (−0.7756 + 1.2841j) 59 (0.9424 − 0.54j)  (−0.5986 + 0.9545j) 60 (−0.5733 − 0.2549j)  (−0.172 + 0.0203j) 61 (−1.0611 − 0.28j)  (−0.6556 + 0.4954j) 62  (0.5797 − 0.2343j) (−1.2347 + 0.8481j) 63  (1.0608 − 0.2502j) (−0.9178 + 0.6516j)

Bit-to-Symbol Mapping for 256-Modulation Order Schemes

An example of the bit-to-symbol mapping for 256-ary non-uniform constellations for code rates ⅔ and ⅘ is given in TABLE 7:

TABLE 7 An example of the bit-to-symbol mapping for 256-ary non-uniform constellations from NN Mapping Code Rate, r = 2/3 Code Rate, r = 4/5 0 (−1.0309 − 1.2883j)  (−0.833 − 0.6718j) 1 (−0.8502 − 1.0541j)  (−0.466 − 1.4825j) 2 (−1.0467 + 1.2821j)  (−1.0369 − 0.6834j)  3 (−0.8606 + 1.0438j)  (−0.1292 − 1.5554j)  4 (−0.1474 − 1.6275j)  (0.8439 − 0.6544j) 5 (−0.1214 − 1.3269j)  (0.4833 − 1.4678j) 6 (−0.1645 + 1.6214j)  (1.0517 − 0.6729j) 7 (−0.1376 + 1.325j)   (0.156 − 1.5533j) 8 (−0.1555 − 0.262j)  (−0.8424 + 0.6547j)  9 (−0.2661 − 0.3671j)  (−0.4881 + 1.4648j)  10 (−0.155 + 0.2545j) (−1.0446 + 0.6609j)  11 (−0.2732 + 0.3618j)  (−0.1531 + 1.5416j)  12 (−0.0753 − 0.275j)  (0.8318 + 0.6704j) 13 (−0.091 − 0.4666j) (0.4579 + 1.484j)  14 (−0.078 + 0.2773j) (1.0374 + 0.6824j) 15 (−0.0927 + 0.4624j)  (0.1222 + 1.5554j) 16 (−1.2646 − 1.06j)    (−0.8114 − 0.8501j)  17 (−1.0432 − 0.8725j)  (−0.7666 − 1.0495j)  18 (−1.2775 + 1.044j)  (−1.0158 − 0.8862j)  19 (−1.0548 + 0.8607j)  (−0.9539 − 1.1302j)  20 (−1.6439 − 0.1751j)  (0.8213 − 0.8365j) 21 (−1.3545 − 0.1443j)  (0.7791 − 1.0298j) 22 (−1.651 + 0.1517j) (1.0312 − 0.8741j) 23 (−1.3531 + 0.1252j)  (0.9748 − 1.1142j) 24 (−0.1967 − 0.1087j)  (−0.8216 + 0.8328j)  25 (−0.3748 − 0.2021j)  (−0.7772 + 1.0261j)  26 (−0.1918 + 0.0992j)  (−1.0317 + 0.8669j)  27 (−0.3822 + 0.194j)  (−0.9709 + 1.1098j)  28 (−0.1197 − 0.0802j)  (0.8112 + 0.8548j) 29 (−0.4481 − 0.0819j)  (0.7651 + 1.0524j) 30  (−0.12 + 0.0763j) (1.0165 + 0.8875j) 31 (−0.4437 + 0.0772j)  (0.9567 + 1.1338j) 32 (−0.7569 − 1.458j)  (−0.6551 − 0.6444j)  33 (−0.627 − 1.1912j) (−0.5403 − 1.2205j)  34 (−0.7746 + 1.4527j)  (−1.2652 − 0.6149j)  35 (−0.6386 + 1.1796j)  (−0.7555 − 1.3569j)  36 (−0.4559 − 1.5578j)  (0.6635 − 0.6314j) 37 (−0.3829 − 1.283j)  (0.5625 − 1.2117j) 38 (−0.4772 + 1.5703j)  (1.2766 − 0.5888j) 39 (−0.3963 + 1.277j)  (0.7747 − 1.3429j) 40 (−0.1525 − 0.2635j)  (−0.6639 + 0.6303j)  41 (−0.2593 − 0.3793j)  (−0.5648 + 1.2103j)  42 (−0.1547 + 0.2555j)  (−1.2769 + 0.5883j)  43 (−0.2609 + 0.3724j)  (−0.7756 + 1.3405j)  44 (−0.0769 − 0.2775j)  (0.6564 + 0.6447j) 45 (−0.1068 − 0.4558j)  (0.5407 + 1.215j)  46 (−0.0812 + 0.2744j)  (1.2701 + 0.6103j) 47 (−0.1137 + 0.4524j)   (0.747 + 1.3553j) 48 (−1.4505 − 0.7934j)  (−0.6293 − 0.8119j)  49 (−1.1915 − 0.6534j)  (−0.5831 − 1.0052j)  50 (−1.4599 + 0.7759j)  (−1.2756 − 0.8434j)  51 (−1.1996 + 0.6368j)  (−1.2068 − 1.11j)    52 (−1.5785 − 0.4933j)  (0.6368 − 0.7976j) 53 (−1.2964 − 0.4059j)  (0.5969 − 0.9978j) 54 (−1.5821 + 0.4758j)  (1.2987 − 0.8262j) 55 (−1.2979 + 0.3889j)  (1.2221 − 1.0854j) 56 (−0.1926 − 0.1051j)  (−0.6437 + 0.804j)  57 (−0.3861 − 0.1959j)  (−0.6002 + 0.9983j)  58 (−0.2046 + 0.1038j)  (−1.2932 + 0.8204j)  59 (−0.394 + 0.2j)    (−1.2228 + 1.0901j)  60 (−0.1165 − 0.0829j)  (0.6281 + 0.8169j) 61 (−0.4419 − 0.0868j)  (0.5847 + 1.0103j) 62 (−0.1181 + 0.0789j)  (1.2836 + 0.8439j) 63 (−0.4446 + 0.0838j)  (1.205 + 1.104j) 64  (1.044 − 1.2792j) (−0.834 − 0.5001j) 65 (0.8595 − 1.0416j) (−0.8212 − 0.0749j)  66 (1.0288 + 1.2916j) (−1.0203 − 0.5063j)  67 (0.8507 + 1.0572j) (−0.997 − 0.0718j) 68  (0.168 − 1.6223j) (0.8488 − 0.4913j) 69 (0.1391 − 1.3292j) (0.8268 − 0.0627j) 70 (0.1467 + 1.6274j) (1.0382 − 0.4922j) 71 (0.1258 + 1.3281j) (1.0046 − 0.0538j) 72 (0.1596 − 0.2514j) (−0.8417 + 0.4859j)  73 (0.2775 − 0.3696j) (−0.8241 + 0.0628j)  74 (0.1528 + 0.2603j) (−1.0297 + 0.4872j)  75 (0.2684 + 0.3683j) (−0.9937 + 0.0545j)  76 (0.0786 − 0.2741j) (0.8344 + 0.5052j) 77 (0.0952 − 0.4566j) (0.8255 + 0.0768j) 78 (0.0802 + 0.2772j)  (1.023 + 0.5086j) 79 (0.0933 + 0.4616j)  (0.996 + 0.0707j) 80 (1.2775 − 1.0482j) (−0.8367 − 0.3491j)  81 (1.0545 − 0.8602j) (−0.8306 − 0.2127j)  82 (1.2616 + 1.0617j) (−1.0358 − 0.3495j)  83 (1.0381 + 0.8704j) (−1.0319 − 0.1928j)  84 (1.6461 − 0.1553j) (0.8423 − 0.3354j) 85 (1.3551 − 0.1273j) (0.8375 − 0.2003j) 86 (1.6492 + 0.174j)  (1.0431 − 0.3346j) 87 (1.3493 + 0.1466j) (1.0385 − 0.1789j) 88 (0.1982 − 0.1043j) (−0.8433 + 0.3323j)  89 (0.3859 − 0.1988j) (−0.8386 + 0.1982j)  90 (0.1948 + 0.1048j) (−1.0436 + 0.3294j)  91 (0.3772 + 0.2009j) (−1.0397 + 0.1798j)  92 (0.1226 − 0.08j)  (0.8388 + 0.3504j) 93 (0.4501 − 0.0802j) (0.8329 + 0.2123j) 94 (0.1137 + 0.076j)  (1.0448 + 0.3499j) 95 (0.4515 + 0.0848j) (1.0381 + 0.1965j) 96 (0.7693 − 1.4481j) (−0.6673 − 0.4924j)  97 (0.6373 − 1.1841j) (−0.6625 − 0.072j)  98 (0.7545 + 1.4609j) (−1.4663 − 0.4376j)  99 (0.6254 + 1.1911j) (−1.4811 − 0.1441j)  100 (0.4742 − 1.5629j) (0.6726 − 0.4751j) 101 (0.3951 − 1.2742j) (0.6643 − 0.0629j) 102 (0.4549 + 1.5735j) (1.4775 − 0.4139j) 103 (0.3825 + 1.2824j) (1.4891 − 0.127j)  104 (0.1616 − 0.2614j) (−0.6704 + 0.4743j)  105 (0.2623 − 0.3739j) (−0.6565 + 0.065j)  106 (0.1531 + 0.2616j) (−1.4695 + 0.4071j)  107 (0.2555 + 0.3781j) (−1.4837 + 0.1219j)  108 (0.0813 − 0.2736j) (0.6645 + 0.4893j) 109 (0.1158 − 0.4563j) (0.6641 + 0.0743j) 110 (0.0803 + 0.2742j) (1.4647 + 0.4351j) 111 (0.1097 + 0.4545j) (1.4832 + 0.1473j) 112 (1.464 − 0.778j) (−0.6648 − 0.3425j)  113 (1.2006 − 0.6389j) (−0.6658 − 0.2057j)  114 (1.4524 + 0.7969j) (−1.2418 − 0.3367j)  115  (1.189 + 0.6528j) (−1.2427 − 0.1189j)  116 (1.5838 − 0.4742j) (0.6711 − 0.3333j) 117 (1.3004 − 0.3897j) (0.6683 − 0.1985j) 118  (1.581 + 0.4938j) (1.2527 − 0.3187j) 119 (1.2996 + 0.408j)  (1.2424 − 0.0953j) 120 (0.1985 − 0.1041j) (−0.6691 + 0.331j)  121 (0.3847 − 0.1915j) (−0.6655 + 0.1958j)  122 (0.1946 + 0.1041j) (−1.2532 + 0.3148j)  123 (0.3839 + 0.1962j) (−1.2427 + 0.0971j)  124 (0.1191 − 0.0776j) (0.6663 + 0.3461j) 125 (0.4508 − 0.0861j) (0.6642 + 0.2081j) 126 (0.1167 + 0.0799j) (1.2465 + 0.3391j) 127 (0.4443 + 0.0901j) (1.2407 + 0.1196j) 128 (−0.6035 − 0.7372j)  (−0.3426 − 0.5924j)  129 (−0.7155 − 0.8765j)  (−0.2948 − 1.317j)  130 (−0.6096 + 0.728j)  (−0.1952 − 0.5751j)  131 (−0.722 + 0.8656j) (−0.095 − 1.3018j) 132 (−0.0972 − 0.9395j)  (0.3513 − 0.5857j) 133 (−0.1068 − 1.1062j)  (0.3113 − 1.3081j) 134 (−0.1056 + 0.9375j)  (0.2063 − 0.5717j) 135 (−0.117 + 1.1098j) (0.1108 − 1.3018j) 136 (−0.4901 − 0.6017j)  (−0.352 + 0.5866j) 137 (−0.3868 − 0.4884j)  (−0.3127 + 1.3081j)  138 (−0.4948 + 0.5952j)  (−0.2069 + 0.5749j)  139 (−0.389 + 0.4809j) (−0.1122 + 1.2975j)  140 (−0.092 − 0.7733j) (0.3472 + 0.5924j) 141 (−0.0898 − 0.6254j)  (0.2899 + 1.3204j) 142 (−0.1033 + 0.7706j)   (0.196 + 0.5779j) 143 (−0.099 + 0.6252j) (0.0884 + 1.3025j) 144 (−0.7442 − 0.6004j)  (−0.3296 − 0.7415j)  145 (−0.8755 − 0.7254j)  (−0.2982 − 0.8937j)  146 (−0.7527 + 0.5925j)  (−0.1843 − 0.722j)  147 (−0.8812 + 0.7162j)  (−0.1784 − 0.8835j)  148 (−0.9662 − 0.1059j)  (0.3428 − 0.7309j) 149 (−1.1316 − 0.1181j)  (0.3163 − 0.8929j) 150 (−0.9633 + 0.0941j)  (0.1964 − 0.7202j) 151 (−1.1364 + 0.1062j)  (0.1902 − 0.8809j) 152 (−0.6278 − 0.4704j)  (−0.3444 + 0.7346j)  153 (−0.5174 − 0.3498j)  (−0.3167 + 0.8895j)  154 (−0.6352 + 0.4622j)  (−0.1963 + 0.7189j)  155 (−0.5174 + 0.3423j)  (−0.1927 + 0.8775j)  156 (−0.7918 − 0.1017j)   (0.328 + 0.7406j) 157 (−0.6303 − 0.101j)  (0.2989 + 0.8936j) 158 (−0.7784 + 0.0789j)  (0.1823 + 0.7228j) 159 (−0.6302 + 0.0919j)  (0.1725 + 0.8831j) 160 (−0.4587 − 0.8301j)  (−0.4947 − 0.6114j)  161 (−0.5311 − 0.9906j)  (−0.3248 − 1.1294j)  162 (−0.4685 + 0.821j)  (−0.061 − 0.566j)  163 (−0.5439 + 0.9794j)  (−0.0995 − 1.1051j)  164 (−0.2781 − 0.9041j)  (0.5007 − 0.6053j) 165 (−0.3272 − 1.0694j)  (0.3383 − 1.1214j) 166 (−0.287 + 0.9011j) (0.0701 − 0.5642j) 167 (−0.3357 + 1.0624j)  (0.1164 − 1.0996j) 168 (−0.3952 − 0.6655j)  (−0.5035 + 0.6025j)  169 (−0.3406 − 0.5227j)  (−0.3414 + 1.1211j)  170 (−0.4004 + 0.6579j)  (−0.073 + 0.5639j) 171 (−0.344 + 0.5158j) (−0.1216 + 1.1005j)  172 (−0.2179 − 0.7465j)  (0.4932 + 0.612j)  173 (−0.1619 − 0.613j)  (0.3197 + 1.1293j) 174 (−0.2257 + 0.7407j)  (0.0628 + 0.5591j) 175 (−0.1663 + 0.6071j)  (0.0984 + 1.0998j) 176 (−0.8432 − 0.4615j)  (−0.4759 − 0.7767j)  177 (−0.9992 − 0.5457j)  (−0.4226 − 0.961j)  178 (−0.8513 + 0.4563j)  (−0.0545 − 0.7211j)  179 (−1.0027 + 0.5337j)  (−0.0625 − 0.9204j)  180 (−0.9271 − 0.2802j)   (0.487 − 0.7678j) 181 (−1.0898 − 0.3382j)  (0.4409 − 0.9567j) 182 (−0.9279 + 0.2705j)  (0.0662 − 0.7211j) 183 (−1.0956 + 0.3271j)  (0.0766 − 0.9222j) 184 (−0.6893 − 0.3855j)   (−0.49 + 0.7663j) 185 (−0.5386 − 0.3113j)  (−0.439 + 0.9536j) 186 (−0.6925 + 0.3774j)  (−0.0673 + 0.7196j)  187 (−0.5459 + 0.303j)  (−0.0782 + 0.9219j)  188 (−0.7697 − 0.2125j)  (0.4742 + 0.774j)  189 (−0.6195 − 0.1445j)  (0.4222 + 0.959j)  190 (−0.7733 + 0.2059j)  (0.0566 + 0.7256j) 191 (−0.6181 + 0.139j)  (0.0591 + 0.9217j) 192 (0.6147 − 0.7308j) (−0.3488 − 0.4502j)  193 (0.7226 − 0.8647j) (−0.3681 − 0.0663j)  194 (0.6019 + 0.737j)  (−0.2044 − 0.4357j)  195 (0.7121 + 0.8745j) (−0.2162 − 0.0601j)  196 (0.1067 − 0.9378j) (0.3578 − 0.4463j) 197 (0.1198 − 1.1044j) (0.3589 − 0.0613j) 198 (0.0973 + 0.9358j) (0.2127 − 0.4358j) 199 (0.1074 + 1.1064j)  (0.219 − 0.0588j) 200 (0.4999 − 0.5998j) (−0.3584 + 0.4476j)  201 (0.3925 − 0.4818j) (−0.3635 + 0.0628j)  202 (0.4906 + 0.6037j) (−0.2118 + 0.4348j)  203 (0.3846 + 0.484j)  (−0.2172 + 0.0603j)  204 (0.1019 − 0.7708j) (0.3513 + 0.4528j) 205 (0.0992 − 0.6236j) (0.3634 + 0.0671j) 206 (0.0958 + 0.7708j)  (0.202 + 0.4379j) 207 (0.0927 + 0.6249j) (0.2195 + 0.0627j) 208 (0.7555 − 0.5917j) (−0.3572 − 0.3189j)  209 (0.8805 − 0.715j)  (−0.3645 − 0.1912j)  210 (0.7434 + 0.6016j) (−0.2071 − 0.3094j)  211 (0.8701 + 0.7261j) (−0.2152 − 0.1813j)  212 (0.9663 − 0.0933j) (0.3612 − 0.3139j) 213 (1.1382 − 0.1046j) (0.3637 − 0.1844j) 214 (0.9617 + 0.1077j) (0.2159 − 0.3054j) 215 (1.1339 + 0.1207j) (0.2181 − 0.1782j) 216 (0.6318 − 0.4615j) (−0.3602 + 0.3131j)  217  (0.525 − 0.3414j) (−0.361 + 0.1865j) 218 (0.6265 + 0.4726j) (−0.2146 + 0.3078j)  219 (0.5164 + 0.3477j) (−0.2214 + 0.187j)  220  (0.795 − 0.0914j) (0.3586 + 0.3214j) 221 (0.6293 − 0.0901j) (0.3616 + 0.1939j) 222 (0.7951 + 0.0982j) (0.2086 + 0.3082j) 223 (0.6326 + 0.1012j) (0.2147 + 0.1801j) 224 (0.4667 − 0.8203j) (−0.4985 − 0.4678j)  225 (0.5406 − 0.9826j) (−0.5089 − 0.0659j)  226 (0.4585 + 0.827j)  (−0.0658 − 0.4274j)  227 (0.5299 + 0.9888j) (−0.0741 − 0.0613j)  228 (0.2871 − 0.902j)  (0.5103 − 0.4618j) 229 (0.3345 − 1.0594j) (0.5132 − 0.0606j) 230 (0.2773 + 0.8994j) (0.0681 − 0.4285j) 231 (0.3241 + 1.0686j) (0.0758 − 0.0607j) 232 (0.4021 − 0.6614j) (−0.5094 + 0.4606j)  233 (0.3489 − 0.5163j) (−0.5092 + 0.0609j)  234 (0.3966 + 0.6663j) (−0.073 + 0.4284j) 235 (0.3383 + 0.5148j) (−0.068 + 0.0594j) 236 (0.2267 − 0.7435j) (0.5029 + 0.4687j) 237 (0.1686 − 0.6051j) (0.5118 + 0.0715j) 238  (0.217 + 0.7431j) (0.0645 + 0.4234j) 239 (0.1593 + 0.6089j)  (0.075 + 0.0621j) 240 (0.8506 − 0.4537j) (−0.5062 − 0.3344j)  241 (1.003 − 0.532j) (−0.5069 − 0.2014j)  242 (0.8401 + 0.4644j) (−0.0709 − 0.3015j)  243 (0.9958 + 0.5484j) (−0.0716 − 0.1761j)  244 (0.9293 − 0.2696j) (0.5109 − 0.3256j) 245 (1.0919 − 0.3262j) (0.5134 − 0.1941j) 246 (0.9291 + 0.2847j) (0.0739 − 0.3015j) 247 (1.0848 + 0.3413j) (0.0733 − 0.1766j) 248 (0.6916 − 0.3755j) (−0.5106 + 0.3233j)  249 (0.5505 − 0.305j)  (−0.5106 + 0.1935j)  250 (0.6919 + 0.3891j) (−0.0733 + 0.2979j)  251 (0.5408 + 0.309j)  (−0.0729 + 0.1793j)  252 (0.7709 − 0.201j)  (0.5078 + 0.3338j) 253 (0.6217 − 0.139j)  (0.5098 + 0.2009j) 254 (0.7696 + 0.216j)  (0.0676 + 0.3007j) 255  (0.616 + 0.1473j) (0.0729 + 0.1779j)

Bit-to-Symbol Mapping for 1024-Modulation Order Schemes

An example of the bit-to-symbol mapping for 1024-ary non-uniform constellations from various embodiments discussed above, including (a) quadrant Lagrangian method (QSL), (b) quadrant symmetric constraint (QSC), and (c) rectangular structure constraint (RSC) for code rates ⅗ is given in TABLE 8 and for code rate 4/5 is given in TABLE 9:

TABLE 8 An example of the bit-to-symbol mapping for 1024-ary non-uniform constellations from NN for code rate 3/5 Map- ping NN_QSL NN_QSC NN_RSC 0 (−0.4436 + 0.1629j)  (0.1882 + 0.0524j) (−0.3051 − 0.3051j) 1 (−0.3972 + 0.9864j)  (0.1882 − 0.0524j) (−0.3051 − 0.3045j) 2 (−0.4398 + 0.2783j) (−0.1882 + 0.0524j) (−0.3051 − 0.7193j) 3 (−0.4297 + 0.6732j) (−0.1882 − 0.0524j) (−0.3051 − 0.7851j) 4 (−0.0602 + 0.1666j)  (0.1889 + 0.0525j) (−0.3051 + 0.3039j) 5 (−0.0498 + 0.8944j)  (0.1889 − 0.0525j) (−0.3051 + 0.3027j) 6 (−0.0583 + 0.283j)  (−0.1889 + 0.0525j) (−0.3051 + 0.7189j) 7 (−0.0629 + 0.6689j) (−0.1889 − 0.0525j) (−0.3051 + 0.7866j) 8 (−0.4539 + 0.1628j)  (0.1383 + 0.3806j) (−0.3051 − 0.4316j) 9 (−0.4065 + 0.8715j)  (0.1383 − 0.3806j) (−0.3051 − 0.4374j) 10 (−0.4512 + 0.2785j) (−0.1383 + 0.3806j) (−0.3051 − 0.5905j) 11 (−0.4253 + 0.7369j) (−0.1383 − 0.3806j) (−0.3051 − 0.5662j) 12 (−0.0591 + 0.1668j)  (0.1413 + 0.3788j) (−0.3051 + 0.4309j) 13 (−0.0678 + 0.8242j)  (0.1413 − 0.3788j) (−0.3051 + 0.4375j) 14 (−0.0612 + 0.2851j) (−0.1413 + 0.3788j) (−0.3051 + 0.5905j) 15  (−0.063 + 0.7017j) (−0.1413 − 0.3788j) (−0.3051 + 0.5676j) 16 (−0.4427 + 0.1627j)  (1.1863 + 0.2942j) (−0.3051 − 0.1795j) 17 (−0.4016 + 0.994j)   (1.1863 − 0.2942j) (−0.3051 − 0.1792j) 18 (−0.4387 + 0.2802j) (−1.1863 + 0.2942j) (−0.3051 − 1.0559j) 19 (−0.4308 + 0.6764j) (−1.1863 − 0.2942j) (−0.3051 − 0.919j)  20 (−0.0611 + 0.1684j)  (1.149 + 0.406j) (−0.3051 + 0.1794j) 21 (−0.0514 + 0.8961j)  (1.149 − 0.406j) (−0.3051 + 0.1796j) 22 (−0.0619 + 0.284j)  (−1.149 + 0.406j) (−0.3051 + 1.0561j) 23 (−0.0595 + 0.668j)  (−1.149 − 0.406j) (−0.3051 + 0.9201j) 24 (−0.4556 + 0.162j)   (0.2812 + 1.0761j) (−0.3051 − 0.0609j) 25 (−0.4051 + 0.8665j)  (0.2812 − 1.0761j) (−0.3051 − 0.0607j) 26 (−0.4501 + 0.2784j) (−0.2812 + 1.0761j) (−0.3051 − 1.2271j) 27 (−0.4242 + 0.7339j) (−0.2812 − 1.0761j) (−0.3051 − 1.4453j) 28 (−0.0613 + 0.1682j)  (0.3918 + 1.0585j) (−0.3051 + 0.0601j) 29 (−0.0681 + 0.8258j)  (0.3918 − 1.0585j) (−0.3051 + 0.0601j) 30 (−0.0614 + 0.2838j) (−0.3918 + 1.0585j) (−0.3051 + 1.228j)  31 (−0.0642 + 0.7042j) (−0.3918 − 1.0585j) (−0.3051 + 1.4486j) 32 (−0.4433 + 0.0562j) (0.0634 + 0.052j) (−0.3045 − 0.3051j) 33 (−0.3879 + 1.1503j) (0.0634 − 0.052j) (−0.3045 − 0.3045j) 34 (−0.4381 + 0.3983j) (−0.0634 + 0.052j)  (−0.3045 − 0.7193j) 35 (−0.4351 + 0.544j)  (−0.0634 − 0.052j)  (−0.3045 − 0.7851j) 36 (−0.0617 + 0.0568j) (0.0626 + 0.052j) (−0.3045 + 0.3039j) 37 (−0.0842 + 1.6424j) (0.0626 − 0.052j) (−0.3045 + 0.3027j) 38 (−0.0612 + 0.4045j) (−0.0626 + 0.052j)  (−0.3045 + 0.7189j) 39  (−0.063 + 0.5411j) (−0.0626 − 0.052j)  (−0.3045 + 0.7866j) 40 (−0.4568 + 0.0559j)  (0.0483 + 0.3828j) (−0.3045 − 0.4316j) 41 (−0.3739 + 1.2957j)  (0.0483 − 0.3828j) (−0.3045 − 0.4374j) 42 (−0.4457 + 0.3965j) (−0.0483 + 0.3828j) (−0.3045 − 0.5905j) 43  (−0.438 + 0.5248j) (−0.0483 − 0.3828j) (−0.3045 − 0.5662j) 44 (−0.0621 + 0.0574j) (0.0465 + 0.383j) (−0.3045 + 0.4309j) 45 (−0.0719 + 1.4634j) (0.0465 − 0.383j) (−0.3045 + 0.4375j) 46 (−0.0624 + 0.4067j) (−0.0465 + 0.383j)  (−0.3045 + 0.5905j) 47 (−0.0623 + 0.5313j) (−0.0465 − 0.383j)  (−0.3045 + 0.5676j) 48 (−0.4439 + 0.0559j)  (1.2119 + 0.1779j) (−0.3045 − 0.1795j) 49  (−0.388 + 1.1192j)  (1.2119 − 0.1779j) (−0.3045 − 0.1792j) 50 (−0.4354 + 0.3947j) (−1.2119 + 0.1779j) (−0.3045 − 1.0559j) 51 (−0.4355 + 0.5456j) (−1.2119 − 0.1779j) (−0.3045 − 0.919j)  52 (−0.0614 + 0.058j)   (1.2248 + 0.0595j) (−0.3045 + 0.1794j) 53  (−0.266 + 1.6246j)  (1.2248 − 0.0595j) (−0.3045 + 0.1796j) 54 (−0.0612 + 0.4046j) (−1.2248 + 0.0595j) (−0.3045 + 1.0561j) 55 (−0.0626 + 0.5408j) (−1.2248 − 0.0595j) (−0.3045 + 0.9201j) 56 (−0.4569 + 0.055j)   (0.1696 + 1.0853j) (−0.3045 − 0.0609j) 57 (−0.3281 + 1.4063j)  (0.1696 − 1.0853j) (−0.3045 − 0.0607j) 58 (−0.4444 + 0.3973j) (−0.1696 + 1.0853j) (−0.3045 − 1.2271j) 59 (−0.4386 + 0.5241j) (−0.1696 − 1.0853j) (−0.3045 − 1.4453j) 60 (−0.0617 + 0.0572j)  (0.057 + 1.0886j) (−0.3045 + 0.0601j) 61 (−0.2102 + 1.4711j)  (0.057 − 1.0886j) (−0.3045 + 0.0601j) 62  (−0.059 + 0.4039j)  (−0.057 + 1.0886j) (−0.3045 + 1.228j)  63 (−0.0618 + 0.5322j)  (−0.057 − 1.0886j) (−0.3045 + 1.4486j) 64 (−0.3132 + 0.1607j)  (0.3061 + 0.0563j) (−0.7193 − 0.3051j) 65 (−0.2576 + 0.9857j)  (0.3061 − 0.0563j) (−0.7193 − 0.3045j) 66 (−0.3106 + 0.2787j) (−0.3061 + 0.0563j) (−0.7193 − 0.7193j) 67 (−0.3064 + 0.6693j) (−0.3061 − 0.0563j) (−0.7193 − 0.7851j) 68 (−0.1824 + 0.166j)   (0.306 + 0.0563j) (−0.7193 + 0.3039j) 69 (−0.1233 + 0.9671j)  (0.306 − 0.0563j) (−0.7193 + 0.3027j) 70 (−0.1819 + 0.2796j)  (−0.306 + 0.0563j) (−0.7193 + 0.7189j) 71 (−0.1851 + 0.6654j)  (−0.306 − 0.0563j) (−0.7193 + 0.7866j) 72 (−0.3111 + 0.1624j)  (0.1843 + 0.4706j) (−0.7193 − 0.4316j) 73 (−0.2822 + 0.8615j)  (0.1843 − 0.4706j) (−0.7193 − 0.4374j) 74 (−0.3093 + 0.2794j) (−0.1843 + 0.4706j) (−0.7193 − 0.5905j) 75 (−0.3039 + 0.7217j) (−0.1843 − 0.4706j) (−0.7193 − 0.5662j) 76 (−0.1806 + 0.1652j)  (0.2033 + 0.4579j) (−0.7193 + 0.4309j) 77 (−0.1752 + 0.8407j)  (0.2033 − 0.4579j) (−0.7193 + 0.4375j) 78  (−0.185 + 0.2805j) (−0.2033 + 0.4579j) (−0.7193 + 0.5905j) 79 (−0.1838 + 0.7066j) (−0.2033 − 0.4579j) (−0.7193 + 0.5676j) 80 (−0.3135 + 0.1615j)  (1.291 + 0.3246j) (−0.7193 − 0.1795j) 81  (−0.258 + 0.9839j)  (1.291 − 0.3246j) (−0.7193 − 0.1792j) 82 (−0.3122 + 0.2776j)  (−1.291 + 0.3246j) (−0.7193 − 1.0559j) 83 (−0.3101 + 0.6718j)  (−1.291 − 0.3246j) (−0.7193 − 0.919j)  84 (−0.1822 + 0.1652j)  (1.2498 + 0.4482j) (−0.7193 + 0.1794j) 85 (−0.1249 + 0.9632j)  (1.2498 − 0.4482j) (−0.7193 + 0.1796j) 86 (−0.1832 + 0.2813j) (−1.2498 + 0.4482j) (−0.7193 + 1.0561j) 87 (−0.1845 + 0.6644j) (−1.2498 − 0.4482j) (−0.7193 + 0.9201j) 88 (−0.3089 + 0.1662j)  (0.2952 + 1.1878j) (−0.7193 − 0.0609j) 89 (−0.2832 + 0.8595j)  (0.2952 − 1.1878j) (−0.7193 − 0.0607j) 90 (−0.3096 + 0.2789j) (−0.2952 + 1.1878j) (−0.7193 − 1.2271j) 91 (−0.3021 + 0.7201j) (−0.2952 − 1.1878j) (−0.7193 − 1.4453j) 92 (−0.1826 + 0.164j)   (0.4147 + 1.1678j) (−0.7193 + 0.0601j) 93 (−0.1764 + 0.8416j)  (0.4147 − 1.1678j) (−0.7193 + 0.0601j) 94 (−0.1823 + 0.2813j) (−0.4147 + 1.1678j) (−0.7193 + 1.228j)  95 (−0.1847 + 0.7051j) (−0.4147 − 1.1678j) (−0.7193 + 1.4486j) 96 (−0.3148 + 0.0557j)  (0.4542 + 0.0691j) (−0.7851 − 0.3051j) 97 (−0.2397 + 1.1183j)  (0.4542 − 0.0691j) (−0.7851 − 0.3045j) 98  (−0.312 + 0.3976j) (−0.4542 + 0.0691j) (−0.7851 − 0.7193j) 99 (−0.3119 + 0.5402j) (−0.4542 − 0.0691j) (−0.7851 − 0.7851j) 100 (−0.1822 + 0.0543j) (0.4539 + 0.069j) (−0.7851 + 0.3039j) 101 (−0.0747 + 1.098j)  (0.4539 − 0.069j) (−0.7851 + 0.3027j) 102 (−0.1814 + 0.3982j) (−0.4539 + 0.069j)  (−0.7851 + 0.7189j) 103 (−0.1849 + 0.5416j) (−0.4539 − 0.069j)  (−0.7851 + 0.7866j) 104 (−0.3132 + 0.0555j)  (0.0723 + 0.5171j) (−0.7851 − 0.4316j) 105 (−0.2252 + 1.2542j)  (0.0723 − 0.5171j) (−0.7851 − 0.4374j) 106 (−0.3079 + 0.3991j) (−0.0723 + 0.5171j) (−0.7851 − 0.5905j) 107 (−0.3118 + 0.5237j) (−0.0723 − 0.5171j) (−0.7851 − 0.5662j) 108 (−0.1825 + 0.0554j)  (0.0491 + 0.5202j) (−0.7851 + 0.4309j) 109 (−0.0704 + 1.2881j)  (0.0491 − 0.5202j) (−0.7851 + 0.4375j) 110 (−0.1825 + 0.4018j) (−0.0491 + 0.5202j) (−0.7851 + 0.5905j) 111 (−0.1827 + 0.5292j) (−0.0491 − 0.5202j) (−0.7851 + 0.5676j) 112  (−0.315 + 0.0547j)  (1.3191 + 0.1962j) (−0.7851 − 0.1795j) 113 (−0.2356 + 1.1172j)  (1.3191 − 0.1962j) (−0.7851 − 0.1792j) 114 (−0.3117 + 0.3978j) (−1.3191 + 0.1962j) (−0.7851 − 1.0559j) 115 (−0.3121 + 0.5414j) (−1.3191 − 0.1962j) (−0.7851 − 0.919j)  116 (−0.1835 + 0.0561j)  (1.3334 + 0.0658j) (−0.7851 + 0.1794j) 117 (−0.0758 + 1.1042j)  (1.3334 − 0.0658j) (−0.7851 + 0.1796j) 118 (−0.1826 + 0.3999j) (−1.3334 + 0.0658j) (−0.7851 + 1.0561j) 119 (−0.1849 + 0.5419j) (−1.3334 − 0.0658j) (−0.7851 + 0.9201j) 120 (−0.3141 + 0.056j)   (0.1765 + 1.1997j) (−0.7851 − 0.0609j) 121 (−0.2127 + 1.2612j)  (0.1765 − 1.1997j) (−0.7851 − 0.0607j) 122 (−0.3091 + 0.3983j) (−0.1765 + 1.1997j) (−0.7851 − 1.2271j) 123 (−0.3108 + 0.524j)  (−0.1765 − 1.1997j) (−0.7851 − 1.4453j) 124  (−0.183 + 0.0551j) (0.0588 + 1.204j) (−0.7851 + 0.0601j) 125 (−0.0822 + 1.2574j) (0.0588 − 1.204j) (−0.7851 + 0.0601j) 126 (−0.1837 + 0.4026j) (−0.0588 + 1.204j)  (−0.7851 + 1.228j)  127 (−0.1833 + 0.5306j) (−0.0588 − 1.204j)  (−0.7851 + 1.4486j) 128  (0.4457 + 0.1663j)  (0.1844 + 0.0517j)  (0.3039 − 0.3051j) 129  (0.4021 + 0.9839j)  (0.1844 − 0.0517j)  (0.3039 − 0.3045j) 130  (0.4379 + 0.2808j) (−0.1844 + 0.0517j)  (0.3039 − 0.7193j) 131  (0.4325 + 0.6762j) (−0.1844 − 0.0517j)  (0.3039 − 0.7851j) 132  (0.0631 + 0.1645j)  (0.185 + 0.0518j)  (0.3039 + 0.3039j) 133  (0.0535 + 0.8976j)  (0.185 − 0.0518j)  (0.3039 + 0.3027j) 134  (0.0623 + 0.2853j)  (−0.185 + 0.0518j)  (0.3039 + 0.7189j) 135  (0.063 + 0.6686j)  (−0.185 − 0.0518j)  (0.3039 + 0.7866j) 136  (0.4544 + 0.1646j)  (0.1366 + 0.3818j)  (0.3039 − 0.4316j) 137  (0.4085 + 0.8717j)  (0.1366 − 0.3818j)  (0.3039 − 0.4374j) 138  (0.4495 + 0.2802j) (−0.1366 + 0.3818j)  (0.3039 − 0.5905j) 139  (0.4239 + 0.7355j) (−0.1366 − 0.3818j)  (0.3039 − 0.5662j) 140  (0.0616 + 0.1678j)  (0.1396 + 0.3793j)  (0.3039 + 0.4309j) 141  (0.0717 + 0.8232j)  (0.1396 − 0.3793j)  (0.3039 + 0.4375j) 142  (0.0601 + 0.2845j) (−0.1396 + 0.3793j)  (0.3039 + 0.5905j) 143  (0.0643 + 0.7007j) (−0.1396 − 0.3793j)  (0.3039 + 0.5676j) 144  (0.4433 + 0.1641j)  (1.0929 + 0.2663j)  (0.3039 − 0.1795j) 145  (0.4014 + 0.9946j)  (1.0929 − 0.2663j)  (0.3039 − 0.1792j) 146  (0.4407 + 0.2809j) (−1.0929 + 0.2663j)  (0.3039 − 1.0559j) 147  (0.4318 + 0.6767j) (−1.0929 − 0.2663j) (0.3039 − 0.919j) 148  (0.0596 + 0.1661j)  (1.0591 + 0.3672j)  (0.3039 + 0.1794j) 149  (0.0534 + 0.8952j)  (1.0591 − 0.3672j)  (0.3039 + 0.1796j) 150  (0.0624 + 0.2838j) (−1.0591 + 0.3672j)  (0.3039 + 1.0561j) 151  (0.0623 + 0.6658j) (−1.0591 − 0.3672j)  (0.3039 + 0.9201j) 152  (0.4542 + 0.1627j)  (0.2721 + 0.9816j)  (0.3039 − 0.0609j) 153  (0.4078 + 0.8696j)  (0.2721 − 0.9816j)  (0.3039 − 0.0607j) 154  (0.453 + 0.2821j) (−0.2721 + 0.9816j)  (0.3039 − 1.2271j) 155  (0.4271 + 0.7389j) (−0.2721 − 0.9816j)  (0.3039 − 1.4453j) 156  (0.0592 + 0.1678j)  (0.3739 + 0.9631j)  (0.3039 + 0.0601j) 157  (0.0682 + 0.8215j)  (0.3739 − 0.9631j)  (0.3039 + 0.0601j) 158  (0.0599 + 0.2834j) (−0.3739 + 0.9631j) (0.3039 + 1.228j) 159 (0.0644 + 0.7j)  (−0.3739 − 0.9631j)  (0.3039 + 1.4486j) 160  (0.4431 + 0.0571j)  (0.064 + 0.0515j)  (0.3027 − 0.3051j) 161  (0.3957 + 1.1527j)  (0.064 − 0.0515j)  (0.3027 − 0.3045j) 162  (0.4383 + 0.3959j)  (−0.064 + 0.0515j)  (0.3027 − 0.7193j) 163  (0.4369 + 0.5469j)  (−0.064 − 0.0515j)  (0.3027 − 0.7851j) 164  (0.0585 + 0.0556j)  (0.0631 + 0.0515j)  (0.3027 + 0.3039j) 165  (0.0883 + 1.6505j)  (0.0631 − 0.0515j)  (0.3027 + 0.3027j) 166  (0.0615 + 0.4042j) (−0.0631 + 0.0515j)  (0.3027 + 0.7189j) 167  (0.0631 + 0.5409j) (−0.0631 − 0.0515j)  (0.3027 + 0.7866j) 168  (0.4538 + 0.0562j)  (0.0485 + 0.3857j)  (0.3027 − 0.4316j) 169  (0.3742 + 1.2962j)  (0.0485 − 0.3857j)  (0.3027 − 0.4374j) 170  (0.4493 + 0.3995j) (−0.0485 + 0.3857j)  (0.3027 − 0.5905j) 171  (0.441 + 0.5283j) (−0.0485 − 0.3857j)  (0.3027 − 0.5662j) 172  (0.0605 + 0.0567j)  (0.0466 + 0.3859j)  (0.3027 + 0.4309j) 173  (0.0749 + 1.4616j)  (0.0466 − 0.3859j)  (0.3027 + 0.4375j) 174  (0.0639 + 0.4059j) (−0.0466 + 0.3859j)  (0.3027 + 0.5905j) 175  (0.0621 + 0.5316j) (−0.0466 − 0.3859j)  (0.3027 + 0.5676j) 176  (0.4428 + 0.0576j)  (1.117 + 0.1611j)  (0.3027 − 0.1795j) 177  (0.3942 + 1.1194j)  (1.117 − 0.1611j)  (0.3027 − 0.1792j) 178 (0.4395 + 0.396j)  (−1.117 + 0.1611j)  (0.3027 − 1.0559j) 179  (0.4386 + 0.5472j)  (−1.117 − 0.1611j) (0.3027 − 0.919j) 180  (0.0632 + 0.0565j)  (1.1289 + 0.0541j)  (0.3027 + 0.1794j) 181  (0.2742 + 1.6248j)  (1.1289 − 0.0541j)  (0.3027 + 0.1796j) 182  (0.0605 + 0.4048j) (−1.1289 + 0.0541j)  (0.3027 + 1.0561j) 183  (0.062 + 0.5419j) (−1.1289 − 0.0541j)  (0.3027 + 0.9201j) 184  (0.4557 + 0.0557j)  (0.1662 + 0.9932j)  (0.3027 − 0.0609j) 185  (0.3307 + 1.4037j)  (0.1662 − 0.9932j)  (0.3027 − 0.0607j) 186  (0.4473 + 0.3995j) (−0.1662 + 0.9932j)  (0.3027 − 1.2271j) 187  (0.4414 + 0.5267j) (−0.1662 − 0.9932j)  (0.3027 − 1.4453j) 188  (0.0626 + 0.0554j)  (0.0565 + 0.9992j)  (0.3027 + 0.0601j) 189  (0.2129 + 1.4638j)  (0.0565 − 0.9992j)  (0.3027 + 0.0601j) 190  (0.0631 + 0.4059j) (−0.0565 + 0.9992j) (0.3027 + 1.228j) 191  (0.0617 + 0.5321j) (−0.0565 − 0.9992j)  (0.3027 + 1.4486j) 192  (0.3132 + 0.1639j)  (0.3195 + 0.0553j)  (0.7189 − 0.3051j) 193  (0.2618 + 0.9824j)  (0.3195 − 0.0553j)  (0.7189 − 0.3045j) 194 (0.3131 + 0.281j) (−0.3195 + 0.0553j)  (0.7189 − 0.7193j) 195  (0.3103 + 0.6676j) (−0.3195 − 0.0553j)  (0.7189 − 0.7851j) 196  (0.1815 + 0.1665j)  (0.3192 + 0.0552j)  (0.7189 + 0.3039j) 197 (0.1257 + 0.965j)  (0.3192 − 0.0552j)  (0.7189 + 0.3027j) 198  (0.1836 + 0.2838j) (−0.3192 + 0.0552j)  (0.7189 + 0.7189j) 199  (0.1883 + 0.6668j) (−0.3192 − 0.0552j)  (0.7189 + 0.7866j) 200  (0.312 + 0.1625j)  (0.1726 + 0.4754j)  (0.7189 − 0.4316j) 201  (0.2852 + 0.8597j)  (0.1726 − 0.4754j)  (0.7189 − 0.4374j) 202  (0.3108 + 0.2809j) (−0.1726 + 0.4754j)  (0.7189 − 0.5905j) 203  (0.3047 + 0.7226j) (−0.1726 − 0.4754j)  (0.7189 − 0.5662j) 204  (0.1829 + 0.1648j)  (0.1882 + 0.4624j)  (0.7189 + 0.4309j) 205  (0.178 + 0.8411j)  (0.1882 − 0.4624j)  (0.7189 + 0.4375j) 206  (0.1828 + 0.2832j) (−0.1882 + 0.4624j)  (0.7189 + 0.5905j) 207  (0.1865 + 0.7073j) (−0.1882 − 0.4624j)  (0.7189 + 0.5676j) 208  (0.3135 + 0.1635j)  (1.4104 + 0.3594j)  (0.7189 − 0.1795j) 209 (0.2594 + 0.982j)  (1.4104 − 0.3594j)  (0.7189 − 0.1792j) 210  (0.3133 + 0.2798j) (−1.4104 + 0.3594j)  (0.7189 − 1.0559j) 211  (0.3112 + 0.6688j) (−1.4104 − 0.3594j) (0.7189 − 0.919j) 212  (0.1821 + 0.1627j)  (1.3645 + 0.4968j)  (0.7189 + 0.1794j) 213  (0.1269 + 0.9655j)  (1.3645 − 0.4968j)  (0.7189 + 0.1796j) 214  (0.1846 + 0.2836j) (−1.3645 + 0.4968j)  (0.7189 + 1.0561j) 215  (0.1886 + 0.6651j) (−1.3645 − 0.4968j)  (0.7189 + 0.9201j) 216  (0.3109 + 0.1627j) (0.3164 + 1.315j)  (0.7189 − 0.0609j) 217  (0.2846 + 0.8585j) (0.3164 − 1.315j)  (0.7189 − 0.0607j) 218  (0.3092 + 0.2805j) (−0.3164 + 1.315j)   (0.7189 − 1.2271j) 219  (0.3047 + 0.7224j) (−0.3164 − 1.315j)   (0.7189 − 1.4453j) 220  (0.1841 + 0.1645j)  (0.4451 + 1.2916j)  (0.7189 + 0.0601j) 221  (0.1766 + 0.8398j)  (0.4451 − 1.2916j)  (0.7189 + 0.0601j) 222  (0.1861 + 0.2834j) (−0.4451 + 1.2916j) (0.7189 + 1.228j) 223  (0.1861 + 0.7085j) (−0.4451 − 1.2916j)  (0.7189 + 1.4486j) 224  (0.3139 + 0.0565j)  (0.421 + 0.0652j)  (0.7866 − 0.3051j) 225  (0.244 + 1.1191j)  (0.421 − 0.0652j)  (0.7866 − 0.3045j) 226  (0.3103 + 0.3997j)  (−0.421 + 0.0652j)  (0.7866 − 0.7193j) 227  (0.3129 + 0.5431j)  (−0.421 − 0.0652j)  (0.7866 − 0.7851j) 228 (0.1826 + 0.055j) (0.4209 + 0.065j)  (0.7866 + 0.3039j) 229    (0.08 + 1.0978j) (0.4209 − 0.065j)  (0.7866 + 0.3027j) 230  (0.1845 + 0.3999j) (−0.4209 + 0.065j)   (0.7866 + 0.7189j) 231  (0.1848 + 0.5411j) (−0.4209 − 0.065j)   (0.7866 + 0.7866j) 232  (0.3114 + 0.0559j)  (0.0738 + 0.5142j)  (0.7866 − 0.4316j) 233  (0.2295 + 1.2458j)  (0.0738 − 0.5142j)  (0.7866 − 0.4374j) 234  (0.3098 + 0.4037j) (−0.0738 + 0.5142j)  (0.7866 − 0.5905j) 235  (0.3121 + 0.5282j) (−0.0738 − 0.5142j)  (0.7866 − 0.5662j) 236  (0.1809 + 0.0553j)  (0.0509 + 0.5166j)  (0.7866 + 0.4309j) 237 (0.0743 + 1.289j)  (0.0509 − 0.5166j)  (0.7866 + 0.4375j) 238  (0.1838 + 0.4025j) (−0.0509 + 0.5166j)  (0.7866 + 0.5905j) 239 (0.1844 + 0.531j) (−0.0509 − 0.5166j)  (0.7866 + 0.5676j) 240  (0.3124 + 0.0574j)  (1.4413 + 0.2175j)  (0.7866 − 0.1795j) 241  (0.2377 + 1.1143j)  (1.4413 − 0.2175j)  (0.7866 − 0.1792j) 242  (0.3127 + 0.3984j) (−1.4413 + 0.2175j)  (0.7866 − 1.0559j) 243  (0.3142 + 0.5418j) (−1.4413 − 0.2175j) (0.7866 − 0.919j) 244  (0.1843 + 0.0564j)  (1.4575 + 0.0727j)  (0.7866 + 0.1794j) 245  (0.0788 + 1.1019j)  (1.4575 − 0.0727j)  (0.7866 + 0.1796j) 246  (0.1841 + 0.4031j) (−1.4575 + 0.0727j)  (0.7866 + 1.0561j) 247 (0.1849 + 0.543j) (−1.4575 − 0.0727j)  (0.7866 + 0.9201j) 248  (0.311 + 0.0559j) (0.1885 + 1.329j)  (0.7866 − 0.0609j) 249  (0.2161 + 1.2595j) (0.1885 − 1.329j)  (0.7866 − 0.0607j) 250  (0.3124 + 0.4009j) (−0.1885 + 1.329j)   (0.7866 − 1.2271j) 251  (0.3127 + 0.5274j) (−0.1885 − 1.329j)   (0.7866 − 1.4453j) 252  (0.1827 + 0.0558j)  (0.0624 + 1.3354j)  (0.7866 + 0.0601j) 253  (0.0798 + 1.2563j)  (0.0624 − 1.3354j)  (0.7866 + 0.0601j) 254  (0.1836 + 0.4039j) (−0.0624 + 1.3354j) (0.7866 + 1.228j) 255  (0.1833 + 0.5285j) (−0.0624 − 1.3354j)  (0.7866 + 1.4486j) 256 (−0.4463 − 0.1639j)  (0.1855 + 0.1634j) (−0.4316 − 0.3051j) 257 (−0.4012 − 0.9844j)  (0.1855 − 0.1634j) (−0.4316 − 0.3045j) 258 (−0.4402 − 0.2796j) (−0.1855 + 0.1634j) (−0.4316 − 0.7193j) 259  (−0.431 − 0.6768j) (−0.1855 − 0.1634j) (−0.4316 − 0.7851j) 260 (−0.0611 − 0.1653j)  (0.1855 + 0.1632j) (−0.4316 + 0.3039j) 261  (−0.054 − 0.8956j)  (0.1855 − 0.1632j) (−0.4316 + 0.3027j) 262 (−0.0593 − 0.2844j) (−0.1855 + 0.1632j) (−0.4316 + 0.7189j) 263 (−0.0637 − 0.6671j) (−0.1855 − 0.1632j) (−0.4316 + 0.7866j) 264 (−0.4571 − 0.1634j)  (0.1677 + 0.2795j) (−0.4316 − 0.4316j) 265 (−0.4078 − 0.8694j)  (0.1677 − 0.2795j) (−0.4316 − 0.4374j) 266 (−0.4542 − 0.2825j) (−0.1677 + 0.2795j) (−0.4316 − 0.5905j) 267 (−0.4268 − 0.7398j) (−0.1677 − 0.2795j) (−0.4316 − 0.5662j) 268 (−0.0615 − 0.1665j)  (0.1679 + 0.2806j) (−0.4316 + 0.4309j) 269 (−0.0668 − 0.8218j)  (0.1679 − 0.2806j) (−0.4316 + 0.4375j) 270 (−0.0618 − 0.2836j) (−0.1679 + 0.2806j) (−0.4316 + 0.5905j) 271 (−0.0659 − 0.7013j) (−0.1679 − 0.2806j) (−0.4316 + 0.5676j) 272 (−0.4426 − 0.1658j)    (1.04 + 0.6132j) (−0.4316 − 0.1795j) 273 (−0.4045 − 0.991j)     (1.04 − 0.6132j) (−0.4316 − 0.1792j) 274 (−0.4439 − 0.2793j)  (−1.04 + 0.6132j) (−0.4316 − 1.0559j) 275 (−0.4312 − 0.6763j)  (−1.04 − 0.6132j) (−0.4316 − 0.919j)  276 (−0.0619 − 0.1669j) (1.0999 + 0.513j) (−0.4316 + 0.1794j) 277 (−0.0516 − 0.8964j) (1.0999 − 0.513j) (−0.4316 + 0.1796j) 278 (−0.0606 − 0.2841j) (−1.0999 + 0.513j)  (−0.4316 + 1.0561j) 279 (−0.0621 − 0.6653j) (−1.0999 − 0.513j)  (−0.4316 + 0.9201j) 280 (−0.4562 − 0.1637j) (0.6058 + 0.989j) (−0.4316 − 0.0609j) 281 (−0.4091 − 0.8668j) (0.6058 − 0.989j) (−0.4316 − 0.0607j) 282 (−0.4518 − 0.2793j) (−0.6058 + 0.989j)  (−0.4316 − 1.2271j) 283 (−0.4263 − 0.7353j) (−0.6058 − 0.989j)  (−0.4316 − 1.4453j) 284 (−0.0616 − 0.1664j)  (0.5002 + 1.0297j) (−0.4316 + 0.0601j) 285 (−0.0694 − 0.8212j)  (0.5002 − 1.0297j) (−0.4316 + 0.0601j) 286 (−0.0621 − 0.2859j) (−0.5002 + 1.0297j) (−0.4316 + 1.228j)  287 (−0.0638 − 0.6996j) (−0.5002 − 1.0297j) (−0.4316 + 1.4486j) 288 (−0.4441 − 0.0564j)  (0.0642 + 0.1537j) (−0.4374 − 0.3051j) 289 (−0.3921 − 1.1538j)  (0.0642 − 0.1537j) (−0.4374 − 0.3045j) 290 (−0.4389 − 0.3984j) (−0.0642 + 0.1537j) (−0.4374 − 0.7193j) 291 (−0.4375 − 0.5492j) (−0.0642 − 0.1537j) (−0.4374 − 0.7851j) 292 (−0.0601 − 0.0565j)  (0.0641 + 0.1536j) (−0.4374 + 0.3039j) 293  (−0.085 − 1.6521j)  (0.0641 − 0.1536j) (−0.4374 + 0.3027j) 294 (−0.0621 − 0.4039j) (−0.0641 + 0.1536j) (−0.4374 + 0.7189j) 295 (−0.0628 − 0.5387j) (−0.0641 − 0.1536j) (−0.4374 + 0.7866j) 296 (−0.4565 − 0.0576j)  (0.0555 + 0.2577j) (−0.4374 − 0.4316j) 297 (−0.3747 − 1.294j)   (0.0555 − 0.2577j) (−0.4374 − 0.4374j) 298 (−0.4464 − 0.4017j) (−0.0555 + 0.2577j) (−0.4374 − 0.5905j) 299 (−0.4436 − 0.5288j) (−0.0555 − 0.2577j) (−0.4374 − 0.5662j) 300  (−0.061 − 0.0561j)  (0.0554 + 0.2578j) (−0.4374 + 0.4309j) 301 (−0.0721 − 1.4593j)  (0.0554 − 0.2578j) (−0.4374 + 0.4375j) 302 (−0.0618 − 0.4061j) (−0.0554 + 0.2578j) (−0.4374 + 0.5905j) 303 (−0.0635 − 0.5302j) (−0.0554 − 0.2578j) (−0.4374 + 0.5676j) 304 (−0.4456 − 0.0571j)  (0.9702 + 0.7075j) (−0.4374 − 0.1795j) 305 (−0.3904 − 1.1162j)  (0.9702 − 0.7075j) (−0.4374 − 0.1792j) 306 (−0.4383 − 0.3992j) (−0.9702 + 0.7075j) (−0.4374 − 1.0559j) 307 (−0.4379 − 0.5468j) (−0.9702 − 0.7075j) (−0.4374 − 0.919j)  308  (−0.062 − 0.0559j)  (0.8908 + 0.7938j) (−0.4374 + 0.1794j) 309 (−0.2695 − 1.6295j)  (0.8908 − 0.7938j) (−0.4374 + 0.1796j) 310  (−0.062 − 0.4037j) (−0.8908 + 0.7938j) (−0.4374 + 1.0561j) 311 (−0.0627 − 0.5416j) (−0.8908 − 0.7938j) (−0.4374 + 0.9201j) 312 (−0.4568 − 0.0577j)  (0.7072 + 0.9358j) (−0.4374 − 0.0609j) 313 (−0.3298 − 1.3989j)  (0.7072 − 0.9358j) (−0.4374 − 0.0607j) 314 (−0.4467 − 0.3999j) (−0.7072 + 0.9358j) (−0.4374 − 1.2271j) 315 (−0.4404 − 0.5285j) (−0.7072 − 0.9358j) (−0.4374 − 1.4453j) 316 (−0.0612 − 0.0559j)  (0.8023 + 0.8711j) (−0.4374 + 0.0601j) 317 (−0.2128 − 1.4708j)  (0.8023 − 0.8711j) (−0.4374 + 0.0601j) 318 (−0.0618 − 0.4046j) (−0.8023 + 0.8711j) (−0.4374 + 1.228j)  319 (−0.0611 − 0.5307j) (−0.8023 − 0.8711j) (−0.4374 + 1.4486j) 320 (−0.3159 − 0.1616j)  (0.293 + 0.1628j) (−0.5905 − 0.3051j) 321 (−0.2603 − 0.9838j)  (0.293 − 0.1628j) (−0.5905 − 0.3045j) 322 (−0.3145 − 0.2812j)  (−0.293 + 0.1628j) (−0.5905 − 0.7193j) 323 (−0.3105 − 0.6693j)  (−0.293 − 0.1628j) (−0.5905 − 0.7851j) 324 (−0.1837 − 0.1651j)  (0.293 + 0.1625j) (−0.5905 + 0.3039j) 325 (−0.1264 − 0.9659j)  (0.293 − 0.1625j) (−0.5905 + 0.3027j) 326 (−0.1851 − 0.2838j)  (−0.293 + 0.1625j) (−0.5905 + 0.7189j) 327 (−0.1865 − 0.6639j)  (−0.293 − 0.1625j) (−0.5905 + 0.7866j) 328 (−0.3126 − 0.1634j) (0.2875 + 0.373j) (−0.5905 − 0.4316j) 329 (−0.2876 − 0.8595j) (0.2875 − 0.373j) (−0.5905 − 0.4374j) 330 (−0.3108 − 0.2794j) (−0.2875 + 0.373j)  (−0.5905 − 0.5905j) 331 (−0.3051 − 0.7213j) (−0.2875 − 0.373j)  (−0.5905 − 0.5662j) 332 (−0.1827 − 0.1672j)  (0.2837 + 0.3794j) (−0.5905 + 0.4309j) 333 (−0.1796 − 0.8387j)  (0.2837 − 0.3794j) (−0.5905 + 0.4375j) 334 (−0.1859 − 0.2832j) (−0.2837 + 0.3794j) (−0.5905 + 0.5905j) 335 (−0.1862 − 0.7084j) (−0.2837 − 0.3794j) (−0.5905 + 0.5676j) 336 (−0.3155 − 0.1627j)  (1.1297 + 0.6783j) (−0.5905 − 0.1795j) 337 (−0.2619 − 0.9855j)  (1.1297 − 0.6783j) (−0.5905 − 0.1792j) 338 (−0.3137 − 0.2821j) (−1.1297 + 0.6783j) (−0.5905 − 1.0559j) 339 (−0.3101 − 0.6678j) (−1.1297 − 0.6783j) (−0.5905 − 0.919j)  340 (−0.183 − 0.165j)  (1.1955 + 0.5675j) (−0.5905 + 0.1794j) 341 (−0.1247 − 0.9674j)  (1.1955 − 0.5675j) (−0.5905 + 0.1796j) 342 (−0.1856 − 0.281j)  (−1.1955 + 0.5675j) (−0.5905 + 1.0561j) 343 (−0.1866 − 0.6624j) (−1.1955 − 0.5675j) (−0.5905 + 0.9201j) 344 (−0.3119 − 0.1637j)  (0.6492 + 1.0902j) (−0.5905 − 0.0609j) 345 (−0.2868 − 0.8599j)  (0.6492 − 1.0902j) (−0.5905 − 0.0607j) 346 (−0.3095 − 0.2803j) (−0.6492 + 1.0902j) (−0.5905 − 1.2271j) 347 (−0.3061 − 0.7215j) (−0.6492 − 1.0902j) (−0.5905 − 1.4453j) 348 (−0.1838 − 0.1657j)  (0.5334 + 1.1357j) (−0.5905 + 0.0601j) 349 (−0.1802 − 0.8426j)  (0.5334 − 1.1357j) (−0.5905 + 0.0601j) 350 (−0.1842 − 0.2806j) (−0.5334 + 1.1357j) (−0.5905 + 1.228j)  351 (−0.1884 − 0.7047j) (−0.5334 − 1.1357j) (−0.5905 + 1.4486j) 352 (−0.3157 − 0.0567j)  (0.4177 + 0.2045j) (−0.5662 − 0.3051j) 353 (−0.2455 − 1.1165j)  (0.4177 − 0.2045j) (−0.5662 − 0.3045j) 354 (−0.3114 − 0.3996j) (−0.4177 + 0.2045j) (−0.5662 − 0.7193j) 355 (−0.3127 − 0.5438j) (−0.4177 − 0.2045j) (−0.5662 − 0.7851j) 356 (−0.1847 − 0.0565j)  (0.4177 + 0.2052j) (−0.5662 + 0.3039j) 357 (−0.0756 − 1.0986j)  (0.4177 − 0.2052j) (−0.5662 + 0.3027j) 358 (−0.1839 − 0.4027j) (−0.4177 + 0.2052j) (−0.5662 + 0.7189j) 359 (−0.1865 − 0.5398j) (−0.4177 − 0.2052j) (−0.5662 + 0.7866j) 360 (−0.3144 − 0.0565j)  (0.3688 + 0.3255j) (−0.5662 − 0.4316j) 361 (−0.2283 − 1.2495j)  (0.3688 − 0.3255j) (−0.5662 − 0.4374j) 362 (−0.3095 − 0.4037j) (−0.3688 + 0.3255j) (−0.5662 − 0.5905j) 363 (−0.3107 − 0.5281j) (−0.3688 − 0.3255j) (−0.5662 − 0.5662j) 364 (−0.1848 − 0.0563j)  (0.3702 + 0.3233j) (−0.5662 + 0.4309j) 365 (−0.0716 − 1.2893j)  (0.3702 − 0.3233j) (−0.5662 + 0.4375j) 366 (−0.1831 − 0.4034j) (−0.3702 + 0.3233j) (−0.5662 + 0.5905j) 367  (−0.186 − 0.5317j) (−0.3702 − 0.3233j) (−0.5662 + 0.5676j) 368 (−0.3148 − 0.0572j)  (1.0512 + 0.7809j) (−0.5662 − 0.1795j) 369 (−0.2394 − 1.1164j)  (1.0512 − 0.7809j) (−0.5662 − 0.1792j) 370 (−0.3113 − 0.3991j) (−1.0512 + 0.7809j) (−0.5662 − 1.0559j) 371 (−0.3128 − 0.5448j) (−1.0512 − 0.7809j) (−0.5662 − 0.919j)  372 (−0.1837 − 0.0551j)  (0.9635 + 0.8762j) (−0.5662 + 0.1794j) 373  (−0.078 − 1.1028j)  (0.9635 − 0.8762j) (−0.5662 + 0.1796j) 374 (−0.1821 − 0.4041j) (−0.9635 + 0.8762j) (−0.5662 + 1.0561j) 375 (−0.1853 − 0.5397j) (−0.9635 − 0.8762j) (−0.5662 + 0.9201j) 376 (−0.3127 − 0.0567j)  (0.761 + 1.0318j) (−0.5662 − 0.0609j) 377 (−0.2149 − 1.2591j)  (0.761 − 1.0318j) (−0.5662 − 0.0607j) 378 (−0.3088 − 0.4004j)  (−0.761 + 1.0318j) (−0.5662 − 1.2271j) 379 (−0.3116 − 0.5285j)  (−0.761 − 1.0318j) (−0.5662 − 1.4453j) 380 (−0.1847 − 0.056j)   (0.8664 + 0.9602j) (−0.5662 + 0.0601j) 381 (−0.0801 − 1.2579j)  (0.8664 − 0.9602j) (−0.5662 + 0.0601j) 382 (−0.1853 − 0.4049j) (−0.8664 + 0.9602j) (−0.5662 + 1.228j)  383 (−0.1844 − 0.5298j) (−0.8664 − 0.9602j) (−0.5662 + 1.4486j) 384  (0.4425 − 0.1648j) (0.1863 + 0.167j)  (0.4309 − 0.3051j) 385  (0.3988 − 0.9835j) (0.1863 − 0.167j)  (0.4309 − 0.3045j) 386  (0.4399 − 0.2776j) (−0.1863 + 0.167j)   (0.4309 − 0.7193j) 387  (0.4309 − 0.6751j) (−0.1863 − 0.167j)   (0.4309 − 0.7851j) 388  (0.0607 − 0.1653j)  (0.1864 + 0.1668j)  (0.4309 + 0.3039j) 389  (0.0532 − 0.8943j)  (0.1864 − 0.1668j)  (0.4309 + 0.3027j) 390  (0.0621 − 0.2824j) (−0.1864 + 0.1668j)  (0.4309 + 0.7189j) 391  (0.0614 − 0.6661j) (−0.1864 − 0.1668j)  (0.4309 + 0.7866j) 392  (0.4541 − 0.1622j)  (0.179 + 0.2802j)  (0.4309 − 0.4316j) 393  (0.4095 − 0.8731j)  (0.179 − 0.2802j)  (0.4309 − 0.4374j) 394  (0.453 − 0.2786j)  (−0.179 + 0.2802j)  (0.4309 − 0.5905j) 395  (0.4263 − 0.7383j)  (−0.179 − 0.2802j)  (0.4309 − 0.5662j) 396  (0.0611 − 0.1662j)  (0.1791 + 0.2814j)  (0.4309 + 0.4309j) 397  (0.069 − 0.8242j)  (0.1791 − 0.2814j)  (0.4309 + 0.4375j) 398  (0.0599 − 0.2843j) (−0.1791 + 0.2814j)  (0.4309 + 0.5905j) 399 (0.0649 − 0.701j) (−0.1791 − 0.2814j)  (0.4309 + 0.5676j) 400  (0.4437 − 0.1663j)  (0.9608 + 0.5557j)  (0.4309 − 0.1795j) 401  (0.4033 − 0.9933j)  (0.9608 − 0.5557j)  (0.4309 − 0.1792j) 402  (0.4404 − 0.2821j) (−0.9608 + 0.5557j)  (0.4309 − 1.0559j) 403 (0.4316 − 0.676j) (−0.9608 − 0.5557j) (0.4309 − 0.919j) 404 (0.0615 − 0.167j) (1.0147 + 0.464j)  (0.4309 + 0.1794j) 405  (0.0533 − 0.8948j) (1.0147 − 0.464j)  (0.4309 + 0.1796j) 406  (0.0612 − 0.2829j) (−1.0147 + 0.464j)   (0.4309 + 1.0561j) 407  (0.063 − 0.6656j) (−1.0147 − 0.464j)   (0.4309 + 0.9201j) 408  (0.4544 − 0.1652j)  (0.5685 + 0.8988j)  (0.4309 − 0.0609j) 409  (0.4086 − 0.8704j)  (0.5685 − 0.8988j)  (0.4309 − 0.0607j) 410  (0.4516 − 0.2784j) (−0.5685 + 0.8988j)  (0.4309 − 1.2271j) 411  (0.4257 − 0.7376j) (−0.5685 − 0.8988j)  (0.4309 − 1.4453j) 412 (0.0618 − 0.167j)  (0.4732 + 0.9359j)  (0.4309 + 0.0601j) 413  (0.0689 − 0.8256j)  (0.4732 − 0.9359j)  (0.4309 + 0.0601j) 414  (0.062 − 0.2833j) (−0.4732 + 0.9359j) (0.4309 + 1.228j) 415  (0.0667 − 0.6992j) (−0.4732 − 0.9359j)  (0.4309 + 1.4486j) 416  (0.4439 − 0.0568j)  (0.0634 + 0.1536j)  (0.4375 − 0.3051j) 417  (0.3929 − 1.1546j)  (0.0634 − 0.1536j)  (0.4375 − 0.3045j) 418  (0.437 − 0.3961j) (−0.0634 + 0.1536j)  (0.4375 − 0.7193j) 419  (0.4346 − 0.5457j) (−0.0634 − 0.1536j)  (0.4375 − 0.7851j) 420  (0.0611 − 0.0605j)  (0.0632 + 0.1535j)  (0.4375 + 0.3039j) 421  (0.0892 − 1.6511j)  (0.0632 − 0.1535j)  (0.4375 + 0.3027j) 422  (0.0617 − 0.4037j) (−0.0632 + 0.1535j)  (0.4375 + 0.7189j) 423  (0.0627 − 0.5417j) (−0.0632 − 0.1535j)  (0.4375 + 0.7866j) 424  (0.457 − 0.0577j)  (0.0541 + 0.2567j)  (0.4375 − 0.4316j) 425  (0.3778 − 1.3029j)  (0.0541 − 0.2567j)  (0.4375 − 0.4374j) 426  (0.4473 − 0.3989j) (−0.0541 + 0.2567j)  (0.4375 − 0.5905j) 427  (0.4419 − 0.5263j) (−0.0541 − 0.2567j)  (0.4375 − 0.5662j) 428  (0.0614 − 0.0588j)  (0.054 + 0.2567j)  (0.4375 + 0.4309j) 429  (0.0775 − 1.4648j)  (0.054 − 0.2567j)  (0.4375 + 0.4375j) 430  (0.0629 − 0.4063j)  (−0.054 + 0.2567j)  (0.4375 + 0.5905j) 431  (0.063 − 0.5307j)  (−0.054 − 0.2567j)  (0.4375 + 0.5676j) 432  (0.444 − 0.054j)  (0.898 + 0.6419j)  (0.4375 − 0.1795j) 433  (0.394 − 1.1154j)  (0.898 − 0.6419j)  (0.4375 − 0.1792j) 434 (0.4385 − 0.397j)  (−0.898 + 0.6419j)  (0.4375 − 1.0559j) 435  (0.4378 − 0.5465j)  (−0.898 − 0.6419j) (0.4375 − 0.919j) 436  (0.0602 − 0.0583j)  (0.8263 + 0.7216j)  (0.4375 + 0.1794j) 437  (0.2731 − 1.6277j)  (0.8263 − 0.7216j)  (0.4375 + 0.1796j) 438  (0.063 − 0.403j) (−0.8263 + 0.7216j)  (0.4375 + 1.0561j) 439  (0.0619 − 0.5397j) (−0.8263 − 0.7216j)  (0.4375 + 0.9201j) 440  (0.4554 − 0.0547j)  (0.6605 + 0.8504j)  (0.4375 − 0.0609j) 441  (0.3334 − 1.4054j)  (0.6605 − 0.8504j)  (0.4375 − 0.0607j) 442  (0.4498 − 0.3989j) (−0.6605 + 0.8504j)  (0.4375 − 1.2271j) 443  (0.4417 − 0.5261j) (−0.6605 − 0.8504j)  (0.4375 − 1.4453j) 444  (0.0616 − 0.0581j)  (0.7468 + 0.7914j)  (0.4375 + 0.0601j) 445  (0.2143 − 1.4736j)  (0.7468 − 0.7914j)  (0.4375 + 0.0601j) 446  (0.061 − 0.4046j) (−0.7468 + 0.7914j) (0.4375 + 1.228j) 447  (0.062 − 0.5304j) (−0.7468 − 0.7914j)  (0.4375 + 1.4486j) 448 (0.3132 − 0.164j)  (0.2991 + 0.1736j)  (0.5905 − 0.3051j) 449 (0.2604 − 0.982j)  (0.2991 − 0.1736j)  (0.5905 − 0.3045j) 450  (0.3108 − 0.2809j) (−0.2991 + 0.1736j)  (0.5905 − 0.7193j) 451  (0.3091 − 0.6673j) (−0.2991 − 0.1736j)  (0.5905 − 0.7851j) 452  (0.1819 − 0.1665j)  (0.2992 + 0.1734j)  (0.5905 + 0.3039j) 453  (0.1263 − 0.9664j)  (0.2992 − 0.1734j)  (0.5905 + 0.3027j) 454  (0.1843 − 0.2836j) (−0.2992 + 0.1734j)  (0.5905 + 0.7189j) 455  (0.1856 − 0.6618j) (−0.2992 − 0.1734j)  (0.5905 + 0.7866j) 456  (0.3109 − 0.1655j)  (0.2758 + 0.3148j)  (0.5905 − 0.4316j) 457  (0.2837 − 0.8602j)  (0.2758 − 0.3148j)  (0.5905 − 0.4374j) 458  (0.3092 − 0.2818j) (−0.2758 + 0.3148j)  (0.5905 − 0.5905j) 459  (0.3043 − 0.7214j) (−0.2758 − 0.3148j)  (0.5905 − 0.5662j) 460  (0.1834 − 0.1644j)  (0.2746 + 0.3175j)  (0.5905 + 0.4309j) 461  (0.1797 − 0.8393j)  (0.2746 − 0.3175j)  (0.5905 + 0.4375j) 462  (0.1849 − 0.2814j) (−0.2746 + 0.3175j)  (0.5905 + 0.5905j) 463  (0.1876 − 0.7068j) (−0.2746 − 0.3175j)  (0.5905 + 0.5676j) 464  (0.3116 − 0.1642j)  (1.2314 + 0.7518j)  (0.5905 − 0.1795j) 465  (0.2604 − 0.9862j)  (1.2314 − 0.7518j)  (0.5905 − 0.1792j) 466  (0.3111 − 0.2808j) (−1.2314 + 0.7518j)  (0.5905 − 1.0559j) 467  (0.3083 − 0.6661j) (−1.2314 − 0.7518j) (0.5905 − 0.919j) 468  (0.1835 − 0.1672j)  (1.3049 + 0.6281j)  (0.5905 + 0.1794j) 469  (0.126 − 0.9679j)  (1.3049 − 0.6281j)  (0.5905 + 0.1796j) 470  (0.1839 − 0.2808j) (−1.3049 + 0.6281j)  (0.5905 + 1.0561j) 471  (0.1864 − 0.6628j) (−1.3049 − 0.6281j)  (0.5905 + 0.9201j) 472  (0.3116 − 0.1632j)  (0.7007 + 1.2053j)  (0.5905 − 0.0609j) 473  (0.2836 − 0.8595j)  (0.7007 − 1.2053j)  (0.5905 − 0.0607j) 474  (0.3092 − 0.2809j) (−0.7007 + 1.2053j)  (0.5905 − 1.2271j) 475  (0.3035 − 0.7203j) (−0.7007 − 1.2053j)  (0.5905 − 1.4453j) 476  (0.1826 − 0.1665j)  (0.5738 + 1.2552j)  (0.5905 + 0.0601j) 477  (0.177 − 0.8415j)  (0.5738 − 1.2552j)  (0.5905 + 0.0601j) 478  (0.1829 − 0.2848j) (−0.5738 + 1.2552j) (0.5905 + 1.228j) 479  (0.1866 − 0.7062j) (−0.5738 − 1.2552j)  (0.5905 + 1.4486j) 480  (0.3145 − 0.0575j) (0.3883 + 0.198j)  (0.5676 − 0.3051j) 481  (0.2424 − 1.1134j) (0.3883 − 0.198j)  (0.5676 − 0.3045j) 482  (0.312 − 0.3975j) (−0.3883 + 0.198j)   (0.5676 − 0.7193j) 483  (0.3147 − 0.5415j) (−0.3883 − 0.198j)   (0.5676 − 0.7851j) 484  (0.1796 − 0.0577j)  (0.3884 + 0.1984j)  (0.5676 + 0.3039j) 485  (0.0776 − 1.1022j)  (0.3884 − 0.1984j)  (0.5676 + 0.3027j) 486 (0.1846 − 0.4j)  (−0.3884 + 0.1984j)  (0.5676 + 0.7189j) 487  (0.1857 − 0.5404j) (−0.3884 − 0.1984j)  (0.5676 + 0.7866j) 488  (0.3098 − 0.0574j)  (0.3488 + 0.3029j)  (0.5676 − 0.4316j) 489  (0.2299 − 1.2495j)  (0.3488 − 0.3029j)  (0.5676 − 0.4374j) 490  (0.3106 − 0.4026j) (−0.3488 + 0.3029j)  (0.5676 − 0.5905j) 491  (0.3109 − 0.5257j) (−0.3488 − 0.3029j)  (0.5676 − 0.5662j) 492  (0.1835 − 0.0579j) (0.3495 + 0.302j)  (0.5676 + 0.4309j) 493  (0.0742 − 1.2921j) (0.3495 − 0.302j)  (0.5676 + 0.4375j) 494  (0.1855 − 0.4017j) (−0.3495 + 0.302j)   (0.5676 + 0.5905j) 495  (0.1829 − 0.5297j) (−0.3495 − 0.302j)   (0.5676 + 0.5676j) 496  (0.3118 − 0.0592j)  (1.1443 + 0.8653j)  (0.5676 − 0.1795j) 497  (0.2395 − 1.1147j)  (1.1443 − 0.8653j)  (0.5676 − 0.1792j) 498 (0.3123 − 0.398j) (−1.1443 + 0.8653j)  (0.5676 − 1.0559j) 499  (0.3136 − 0.5422j) (−1.1443 − 0.8653j) (0.5676 − 0.919j) 500  (0.1816 − 0.0607j)  (1.0475 + 0.9694j)  (0.5676 + 0.1794j) 501  (0.0773 − 1.1108j)  (1.0475 − 0.9694j)  (0.5676 + 0.1796j) 502  (0.185 − 0.3996j) (−1.0475 + 0.9694j)  (0.5676 + 1.0561j) 503  (0.186 − 0.5408j) (−1.0475 − 0.9694j)  (0.5676 + 0.9201j) 504  (0.3115 − 0.0555j)  (0.8236 + 1.1404j)  (0.5676 − 0.0609j) 505  (0.2196 − 1.2598j)  (0.8236 − 1.1404j)  (0.5676 − 0.0607j) 506  (0.3106 − 0.4051j) (−0.8236 + 1.1404j)  (0.5676 − 1.2271j) 507  (0.3088 − 0.5263j) (−0.8236 − 1.1404j)  (0.5676 − 1.4453j) 508  (0.1827 − 0.0583j) (0.9399 + 1.062j)  (0.5676 + 0.0601j) 509  (0.0816 − 1.2601j) (0.9399 − 1.062j)  (0.5676 + 0.0601j) 510  (0.1833 − 0.4008j) (−0.9399 + 1.062j)  (0.5676 + 1.228j) 511  (0.1861 − 0.5291j) (−0.9399 − 1.062j)   (0.5676 + 1.4486j) 512 (−0.6227 + 0.1645j) (0.8321 + 0.193j) (−0.1795 − 0.3051j) 513 (−0.5436 + 0.9862j) (0.8321 − 0.193j) (−0.1795 − 0.3045j) 514 (−0.6129 + 0.2814j) (−0.8321 + 0.193j)  (−0.1795 − 0.7193j) 515 (−0.5663 + 0.6799j) (−0.8321 − 0.193j)  (−0.1795 − 0.7851j) 516 (−1.2862 + 0.2201j)  (0.8151 + 0.2453j) (−0.1795 + 0.3039j) 517 (−1.0365 + 0.9846j)  (0.8151 − 0.2453j) (−0.1795 + 0.3027j) 518 (−1.2651 + 0.3694j) (−0.8151 + 0.2453j) (−0.1795 + 0.7189j) 519 (−1.1121 + 0.8407j) (−0.8151 − 0.2453j) (−0.1795 + 0.7866j) 520 (−0.5867 + 0.1624j)  (0.2429 + 0.7216j) (−0.1795 − 0.4316j) 521 (−0.5516 + 0.8732j)  (0.2429 − 0.7216j) (−0.1795 − 0.4374j) 522 (−0.5798 + 0.2789j) (−0.2429 + 0.7216j) (−0.1795 − 0.5905j) 523 (−0.5544 + 0.7452j) (−0.2429 − 0.7216j) (−0.1795 − 0.5662j) 524 (−1.7794 + 0.2913j)  (0.3191 + 0.6989j) (−0.1795 + 0.4309j) 525 (−1.3142 + 1.3286j)  (0.3191 − 0.6989j) (−0.1795 + 0.4375j) 526 (−1.7442 + 0.4947j) (−0.3191 + 0.6989j) (−0.1795 + 0.5905j) 527 (−1.4975 + 1.1188j) (−0.3191 − 0.6989j) (−0.1795 + 0.5676j) 528 (−0.6252 + 0.1641j)  (0.9202 + 0.2151j) (−0.1795 − 0.1795j) 529 (−0.5423 + 0.9986j)  (0.9202 − 0.2151j) (−0.1795 − 0.1792j) 530 (−0.6136 + 0.2813j) (−0.9202 + 0.2151j) (−0.1795 − 1.0559j) 531 (−0.5675 + 0.6818j) (−0.9202 − 0.2151j) (−0.1795 − 0.919j)  532 (−1.4072 + 0.2385j) (0.8955 + 0.29j)  (−0.1795 + 0.1794j) 533 (−1.0931 + 1.0525j) (0.8955 − 0.29j)  (−0.1795 + 0.1796j) 534 (−1.3798 + 0.3969j) (−0.8955 + 0.29j)  (−0.1795 + 1.0561j) 535 (−1.2017 + 0.8794j) (−0.8955 − 0.29j)  (−0.1795 + 0.9201j) 536 (−0.5868 + 0.1631j) (0.2587 + 0.82j)  (−0.1795 − 0.0609j) 537 (−0.5538 + 0.8711j) (0.2587 − 0.82j)  (−0.1795 − 0.0607j) 538 (−0.5818 + 0.2804j) (−0.2587 + 0.82j)  (−0.1795 − 1.2271j) 539 (−0.5562 + 0.7436j) (−0.2587 − 0.82j)  (−0.1795 − 1.4453j) 540  (−1.574 + 0.2573j)  (0.3448 + 0.7935j) (−0.1795 + 0.0601j) 541 (−1.2295 + 1.1433j)  (0.3448 − 0.7935j) (−0.1795 + 0.0601j) 542  (−1.544 + 0.4427j) (−0.3448 + 0.7935j) (−0.1795 + 1.228j)  543 (−1.3376 + 0.9743j) (−0.3448 − 0.7935j) (−0.1795 + 1.4486j) 544  (−0.628 + 0.0558j)  (0.8526 + 0.0967j) (−0.1792 − 0.3051j) 545 (−0.5287 + 1.1843j)  (0.8526 − 0.0967j) (−0.1792 − 0.3045j) 546 (−0.6062 + 0.4018j) (−0.8526 + 0.0967j) (−0.1792 − 0.7193j) 547 (−0.5817 + 0.5451j) (−0.8526 − 0.0967j) (−0.1792 − 0.7851j) 548 (−1.3006 + 0.0729j)  (0.8582 + 0.0486j) (−0.1792 + 0.3039j) 549 (−0.1272 + 1.8556j)  (0.8582 − 0.0486j) (−0.1792 + 0.3027j) 550  (−1.231 + 0.5136j) (−0.8582 + 0.0486j) (−0.1792 + 0.7189j) 551 (−1.1874 + 0.6662j) (−0.8582 − 0.0486j) (−0.1792 + 0.7866j) 552 (−0.5897 + 0.0577j)  (0.1472 + 0.7455j) (−0.1792 − 0.4316j) 553 (−0.5169 + 1.3322j)  (0.1472 − 0.7455j) (−0.1792 − 0.4374j) 554 (−0.5752 + 0.4027j) (−0.1472 + 0.7455j) (−0.1792 − 0.5905j) 555 (−0.5606 + 0.5245j) (−0.1472 − 0.7455j) (−0.1792 − 0.5662j) 556 (−1.7966 + 0.0968j)  (0.0513 + 0.7587j) (−0.1792 + 0.4309j) 557 (−0.8231 + 1.7139j)  (0.0513 − 0.7587j) (−0.1792 + 0.4375j) 558 (−1.6882 + 0.6974j) (−0.0513 + 0.7587j) (−0.1792 + 0.5905j) 559 (−1.6057 + 0.905j)  (−0.0513 − 0.7587j) (−0.1792 + 0.5676j) 560 (−0.6265 + 0.0547j)  (0.9408 + 0.1226j) (−0.1792 − 0.1795j) 561 (−0.5314 + 1.131j)   (0.9408 − 0.1226j) (−0.1792 − 0.1792j) 562 (−0.6086 + 0.402j)  (−0.9408 + 0.1226j) (−0.1792 − 1.0559j) 563 (−0.5832 + 0.5446j) (−0.9408 − 0.1226j) (−0.1792 − 0.919j)  564 (−1.4219 + 0.0793j) (0.9496 + 0.047j) (−0.1792 + 0.1794j) 565 (−0.3738 + 1.8028j) (0.9496 − 0.047j) (−0.1792 + 0.1796j) 566 (−1.3453 + 0.5519j) (−0.9496 + 0.047j)  (−0.1792 + 1.0561j) 567 (−1.2785 + 0.7176j) (−0.9496 − 0.047j)  (−0.1792 + 0.9201j) 568 (−0.5885 + 0.0554j)  (0.1603 + 0.8422j) (−0.1792 − 0.0609j) 569 (−0.4892 + 1.4833j)  (0.1603 − 0.8422j) (−0.1792 − 0.0607j) 570 (−0.5776 + 0.4018j) (−0.1603 + 0.8422j) (−0.1792 − 1.2271j) 571 (−0.5652 + 0.527j)  (−0.1603 − 0.8422j) (−0.1792 − 1.4453j) 572 (−1.5881 + 0.0862j)  (0.0544 + 0.8559j) (−0.1792 + 0.0601j) 573 (−0.5614 + 1.6802j)  (0.0544 − 0.8559j) (−0.1792 + 0.0601j) 574 (−1.4975 + 0.6188j) (−0.0544 + 0.8559j) (−0.1792 + 1.228j)  575 (−1.4256 + 0.7973j) (−0.0544 − 0.8559j) (−0.1792 + 1.4486j) 576 (−0.7542 + 0.1663j) (0.5835 + 0.145j) (−1.0559 − 0.3051j) 577 (−0.6935 + 1.0034j) (0.5835 − 0.145j) (−1.0559 − 0.3045j) 578 (−0.7436 + 0.2856j) (−0.5835 + 0.145j)  (−1.0559 − 0.7193j) 579 (−0.6843 + 0.6705j) (−0.5835 − 0.145j)  (−1.0559 − 0.7851j) 580 (−1.1569 + 0.2004j)  (0.5837 + 0.1468j) (−1.0559 + 0.3039j) 581  (−0.892 + 1.0205j)  (0.5837 − 0.1468j) (−1.0559 + 0.3027j) 582 (−1.1324 + 0.3418j) (−0.5837 + 0.1468j) (−1.0559 + 0.7189j) 583 (−1.0142 + 0.7744j) (−0.5837 − 0.1468j) (−1.0559 + 0.7866j) 584 (−0.8411 + 0.1733j)  (0.2107 + 0.5776j) (−1.0559 − 0.4316j) 585  (−0.704 + 0.8771j)  (0.2107 − 0.5776j) (−1.0559 − 0.4374j) 586 (−0.8307 + 0.2961j) (−0.2107 + 0.5776j) (−1.0559 − 0.5905j) 587 (−0.7238 + 0.7219j) (−0.2107 − 0.5776j) (−1.0559 − 0.5662j) 588 (−0.9702 + 0.1841j)  (0.2541 + 0.5487j) (−1.0559 + 0.4309j) 589 (−0.8433 + 0.8757j)  (0.2541 − 0.5487j) (−1.0559 + 0.4375j) 590 (−0.9553 + 0.3136j) (−0.2541 + 0.5487j) (−1.0559 + 0.5905j) 591 (−0.8687 + 0.7403j) (−0.2541 − 0.5487j) (−1.0559 + 0.5676j) 592 (−0.7512 + 0.1657j) (1.7239 + 0.449j) (−1.0559 − 0.1795j) 593 (−0.6981 + 1.0166j) (1.7239 − 0.449j) (−1.0559 − 0.1792j) 594 (−0.7443 + 0.2868j) (−1.7239 + 0.449j)  (−1.0559 − 1.0559j) 595 (−0.6877 + 0.6784j) (−1.7239 − 0.449j)  (−1.0559 − 0.919j)  596 (−1.1052 + 0.197j)   (1.6668 + 0.6204j) (−1.0559 + 0.1794j) 597 (−0.8631 + 1.0063j)  (1.6668 − 0.6204j) (−1.0559 + 0.1796j) 598 (−1.0823 + 0.3312j) (−1.6668 + 0.6204j) (−1.0559 + 1.0561j) 599 (−0.9851 + 0.7489j) (−1.6668 − 0.6204j) (−1.0559 + 0.9201j) 600 (−0.8419 + 0.1741j)  (0.3776 + 1.6445j) (−1.0559 − 0.0609j) 601 (−0.7023 + 0.8722j)  (0.3776 − 1.6445j) (−1.0559 − 0.0607j) 602 (−0.8243 + 0.2959j) (−0.3776 + 1.6445j) (−1.0559 − 1.2271j) 603 (−0.7203 + 0.7251j) (−0.3776 − 1.6445j) (−1.0559 − 1.4453j) 604 (−0.9876 + 0.1862j)  (0.5319 + 1.6115j) (−1.0559 + 0.0601j) 605 (−0.8441 + 0.8814j)  (0.5319 − 1.6115j) (−1.0559 + 0.0601j) 606 (−0.9688 + 0.3144j) (−0.5319 + 1.6115j) (−1.0559 + 1.228j)  607 (−0.8788 + 0.7414j) (−0.5319 − 1.6115j) (−1.0559 + 1.4486j) 608 (−0.7574 + 0.0547j)  (0.5584 + 0.0608j)  (−0.919 − 0.3051j) 609 (−0.7036 + 1.1955j)  (0.5584 − 0.0608j)  (−0.919 − 0.3045j) 610 (−0.7332 + 0.4129j) (−0.5584 + 0.0608j)  (−0.919 − 0.7193j) 611 (−0.7094 + 0.5524j) (−0.5584 − 0.0608j)  (−0.919 − 0.7851j) 612 (−1.1685 + 0.0665j)  (0.5584 + 0.0594j)  (−0.919 + 0.3039j) 613 (−0.8661 + 1.1985j)  (0.5584 − 0.0594j)  (−0.919 + 0.3027j) 614 (−1.0999 + 0.4799j) (−0.5584 + 0.0594j)  (−0.919 + 0.7189j) 615 (−1.0732 + 0.6266j) (−0.5584 − 0.0594j)  (−0.919 + 0.7866j) 616 (−0.8522 + 0.0583j)  (0.113 + 0.621j)  (−0.919 − 0.4316j) 617 (−0.6738 + 1.331j)   (0.113 − 0.621j)  (−0.919 − 0.4374j) 618 (−0.8097 + 0.4242j) (−0.113 + 0.621j)  (−0.919 − 0.5905j) 619 (−0.7853 + 0.5572j) (−0.113 − 0.621j)  (−0.919 − 0.5662j) 620 (−0.9772 + 0.0605j)  (0.0488 + 0.6357j)  (−0.919 + 0.4309j) 621 (−1.0775 + 1.5207j)  (0.0488 − 0.6357j)  (−0.919 + 0.4375j) 622 (−0.9325 + 0.4453j) (−0.0488 + 0.6357j)  (−0.919 + 0.5905j) 623 (−0.9066 + 0.5865j) (−0.0488 − 0.6357j)  (−0.919 + 0.5676j) 624 (−0.7569 + 0.0541j)  (1.7619 + 0.2717j)  (−0.919 − 0.1795j) 625  (−0.68 + 1.1391j)  (1.7619 − 0.2717j)  (−0.919 − 0.1792j) 626 (−0.7355 + 0.4136j) (−1.7619 + 0.2717j)  (−0.919 − 1.0559j) 627 (−0.7132 + 0.5556j) (−1.7619 − 0.2717j) (−0.919 − 0.919j) 628 (−1.1174 + 0.0638j)  (1.7821 + 0.0908j)  (−0.919 + 0.1794j) 629 (−0.9889 + 1.2725j)  (1.7821 − 0.0908j)  (−0.919 + 0.1796j) 630 (−1.0597 + 0.4682j) (−1.7821 + 0.0908j)  (−0.919 + 1.0561j) 631 (−1.0311 + 0.616j)  (−1.7821 − 0.0908j)  (−0.919 + 0.9201j) 632 (−0.8497 + 0.0561j)  (0.2251 + 1.6619j)  (−0.919 − 0.0609j) 633 (−0.6858 + 1.4691j)  (0.2251 − 1.6619j)  (−0.919 − 0.0607j) 634 (−0.8029 + 0.424j)  (−0.2251 + 1.6619j)  (−0.919 − 1.2271j) 635 (−0.7825 + 0.5601j) (−0.2251 − 1.6619j)  (−0.919 − 1.4453j) 636 (−0.9912 + 0.0613j)  (0.0747 + 1.6718j)  (−0.919 + 0.0601j) 637 (−0.8802 + 1.4402j)  (0.0747 − 1.6718j)  (−0.919 + 0.0601j) 638 (−0.944 + 0.446j) (−0.0747 + 1.6718j) (−0.919 + 1.228j) 639 (−0.9145 + 0.5877j) (−0.0747 − 1.6718j)  (−0.919 + 1.4486j) 640  (0.6235 + 0.1649j)  (0.7504 + 0.1738j)  (0.1794 − 0.3051j) 641  (0.5445 + 0.9871j)  (0.7504 − 0.1738j)  (0.1794 − 0.3045j) 642  (0.6165 + 0.2839j) (−0.7504 + 0.1738j)  (0.1794 − 0.7193j) 643  (0.5678 + 0.6808j) (−0.7504 − 0.1738j)  (0.1794 − 0.7851j) 644  (1.2839 + 0.2269j)  (0.7429 + 0.2033j)  (0.1794 + 0.3039j) 645  (1.0357 + 0.9897j)  (0.7429 − 0.2033j)  (0.1794 + 0.3027j) 646  (1.264 + 0.3765j) (−0.7429 + 0.2033j)  (0.1794 + 0.7189j) 647  (1.1137 + 0.8483j) (−0.7429 − 0.2033j)  (0.1794 + 0.7866j) 648  (0.5856 + 0.1664j)  (0.2368 + 0.6902j)  (0.1794 − 0.4316j) 649  (0.5534 + 0.8718j)  (0.2368 − 0.6902j)  (0.1794 − 0.4374j) 650  (0.5822 + 0.2813j) (−0.2368 + 0.6902j)  (0.1794 − 0.5905j) 651  (0.5561 + 0.7489j) (−0.2368 − 0.6902j)  (0.1794 − 0.5662j) 652  (1.7789 + 0.3004j)  (0.3057 + 0.6584j)  (0.1794 + 0.4309j) 653  (1.3158 + 1.3361j)  (0.3057 − 0.6584j)  (0.1794 + 0.4375j) 654  (1.7471 + 0.5029j) (−0.3057 + 0.6584j)  (0.1794 + 0.5905j) 655  (1.5019 + 1.1286j) (−0.3057 − 0.6584j)  (0.1794 + 0.5676j) 656  (0.6222 + 0.1662j)  (1.0031 + 0.2389j)  (0.1794 − 0.1795j) 657  (0.5436 + 1.0014j)  (1.0031 − 0.2389j)  (0.1794 − 0.1792j) 658  (0.6183 + 0.2826j) (−1.0031 + 0.2389j)  (0.1794 − 1.0559j) 659  (0.5658 + 0.6807j) (−1.0031 − 0.2389j) (0.1794 − 0.919j) 660  (1.4032 + 0.2435j)  (0.9725 + 0.3279j)  (0.1794 + 0.1794j) 661  (1.0963 + 1.0564j)  (0.9725 − 0.3279j)  (0.1794 + 0.1796j) 662  (1.383 + 0.4027j) (−0.9725 + 0.3279j)  (0.1794 + 1.0561j) 663  (1.202 + 0.883j) (−0.9725 − 0.3279j)  (0.1794 + 0.9201j) 664  (0.5828 + 0.1664j)  (0.2642 + 0.8819j)  (0.1794 − 0.0609j) 665  (0.5514 + 0.8708j)  (0.2642 − 0.8819j)  (0.1794 − 0.0607j) 666  (0.5814 + 0.2799j) (−0.2642 + 0.8819j)  (0.1794 − 1.2271j) 667 (0.5548 + 0.746j) (−0.2642 − 0.8819j)  (0.1794 − 1.4453j) 668  (1.5686 + 0.2684j)  (0.3578 + 0.8654j)  (0.1794 + 0.0601j) 669  (1.228 + 1.1483j)  (0.3578 − 0.8654j)  (0.1794 + 0.0601j) 670  (1.5442 + 0.4492j) (−0.3578 + 0.8654j) (0.1794 + 1.228j) 671  (1.3328 + 0.9769j) (−0.3578 − 0.8654j)  (0.1794 + 1.4486j) 672  (0.6261 + 0.0567j)  (0.7641 + 0.0701j)  (0.1796 − 0.3051j) 673  (0.5291 + 1.1814j)  (0.7641 − 0.0701j)  (0.1796 − 0.3045j) 674  (0.609 + 0.4066j) (−0.7641 + 0.0701j)  (0.1796 − 0.7193j) 675  (0.5827 + 0.5481j) (−0.7641 − 0.0701j)  (0.1796 − 0.7851j) 676  (1.2988 + 0.0783j)  (0.7659 + 0.0487j)  (0.1796 + 0.3039j) 677  (0.1337 + 1.8634j)  (0.7659 − 0.0487j)  (0.1796 + 0.3027j) 678  (1.2328 + 0.5201j) (−0.7659 + 0.0487j)  (0.1796 + 0.7189j) 679 (1.1891 + 0.671j) (−0.7659 − 0.0487j)  (0.1796 + 0.7866j) 680  (0.5865 + 0.0563j)  (0.1431 + 0.7251j)  (0.1796 − 0.4316j) 681  (0.5176 + 1.3243j)  (0.1431 − 0.7251j)  (0.1796 − 0.4374j) 682 (0.5713 + 0.403j) (−0.1431 + 0.7251j)  (0.1796 − 0.5905j) 683  (0.5633 + 0.5286j) (−0.1431 − 0.7251j)  (0.1796 − 0.5662j) 684  (1.7888 + 0.1044j)  (0.0506 + 0.7433j)  (0.1796 + 0.4309j) 685  (0.829 + 1.7154j)  (0.0506 − 0.7433j)  (0.1796 + 0.4375j) 686  (1.6889 + 0.7064j) (−0.0506 + 0.7433j)  (0.1796 + 0.5905j) 687  (1.6085 + 0.9071j) (−0.0506 − 0.7433j)  (0.1796 + 0.5676j) 688  (0.626 + 0.0571j)  (1.0258 + 0.1432j)  (0.1796 − 0.1795j) 689  (0.5386 + 1.1329j)  (1.0258 − 0.1432j)  (0.1796 − 0.1792j) 690  (0.607 + 0.4048j) (−1.0258 + 0.1432j)  (0.1796 − 1.0559j) 691  (0.5823 + 0.5452j) (−1.0258 − 0.1432j) (0.1796 − 0.919j) 692  (1.4175 + 0.0845j)  (1.0364 + 0.0494j)  (0.1796 + 0.1794j) 693  (0.3747 + 1.7968j)  (1.0364 − 0.0494j)  (0.1796 + 0.1796j) 694  (1.3445 + 0.5598j) (−1.0364 + 0.0494j)  (0.1796 + 1.0561j) 695  (1.2785 + 0.7205j) (−1.0364 − 0.0494j)  (0.1796 + 0.9201j) 696  (0.5876 + 0.0571j)  (0.1624 + 0.8923j)  (0.1796 − 0.0609j) 697  (0.4965 + 1.4819j)  (0.1624 − 0.8923j)  (0.1796 − 0.0607j) 698  (0.575 + 0.4038j) (−0.1624 + 0.8923j)  (0.1796 − 1.2271j) 699  (0.5618 + 0.5281j) (−0.1624 − 0.8923j)  (0.1796 − 1.4453j) 700  (1.5817 + 0.0942j)  (0.0553 + 0.8988j)  (0.1796 + 0.0601j) 701 (0.5631 + 1.679j)  (0.0553 − 0.8988j)  (0.1796 + 0.0601j) 702  (1.491 + 0.6223j) (−0.0553 + 0.8988j) (0.1796 + 1.228j) 703  (1.4216 + 0.7997j) (−0.0553 − 0.8988j)  (0.1796 + 1.4486j) 704  (0.7485 + 0.1703j)  (0.6607 + 0.1535j)  (1.0561 − 0.3051j) 705  (0.6949 + 1.0025j)  (0.6607 − 0.1535j)  (1.0561 − 0.3045j) 706  (0.7435 + 0.2913j) (−0.6607 + 0.1535j)  (1.0561 − 0.7193j) 707  (0.6888 + 0.6815j) (−0.6607 − 0.1535j)  (1.0561 − 0.7851j) 708  (1.1533 + 0.2081j) (0.6594 + 0.163j)  (1.0561 + 0.3039j) 709  (0.8978 + 1.0283j) (0.6594 − 0.163j)  (1.0561 + 0.3027j) 710  (1.1333 + 0.3461j) (−0.6594 + 0.163j)   (1.0561 + 0.7189j) 711  (1.0119 + 0.7766j) (−0.6594 − 0.163j)   (1.0561 + 0.7866j) 712  (0.8414 + 0.1771j) (0.2136 + 0.59j)   (1.0561 − 0.4316j) 713  (0.7032 + 0.8792j) (0.2136 − 0.59j)   (1.0561 − 0.4374j) 714  (0.8286 + 0.2992j) (−0.2136 + 0.59j)   (1.0561 − 0.5905j) 715  (0.7299 + 0.7291j) (−0.2136 − 0.59j)   (1.0561 − 0.5662j) 716  (0.9611 + 0.1876j) (0.2638 + 0.568j)  (1.0561 + 0.4309j) 717  (0.8455 + 0.8827j) (0.2638 − 0.568j)  (1.0561 + 0.4375j) 718  (0.9556 + 0.3162j) (−0.2638 + 0.568j)   (1.0561 + 0.5905j) 719  (0.8702 + 0.7449j) (−0.2638 − 0.568j)   (1.0561 + 0.5676j) 720  (0.7511 + 0.1706j)  (1.5512 + 0.4002j)  (1.0561 − 0.1795j) 721 (0.6959 + 1.013j)  (1.5512 − 0.4002j)  (1.0561 − 0.1792j) 722  (0.7428 + 0.2911j) (−1.5512 + 0.4002j)  (1.0561 − 1.0559j) 723  (0.6864 + 0.6795j) (−1.5512 − 0.4002j) (1.0561 − 0.919j) 724  (1.1016 + 0.2011j) (1.5002 + 0.553j)  (1.0561 + 0.1794j) 725  (0.8637 + 1.0087j) (1.5002 − 0.553j)  (1.0561 + 0.1796j) 726  (1.0881 + 0.3373j) (−1.5002 + 0.553j)   (1.0561 + 1.0561j) 727  (0.9844 + 0.7545j) (−1.5002 − 0.553j)   (1.0561 + 0.9201j) 728  (0.8387 + 0.1788j)  (0.3436 + 1.4636j)  (1.0561 − 0.0609j) 729  (0.7083 + 0.8765j)  (0.3436 − 1.4636j)  (1.0561 − 0.0607j) 730  (0.8235 + 0.2991j) (−0.3436 + 1.4636j)  (1.0561 − 1.2271j) 731  (0.7284 + 0.7308j) (−0.3436 − 1.4636j)  (1.0561 − 1.4453j) 732  (0.9821 + 0.1904j)  (0.4838 + 1.4363j)  (1.0561 + 0.0601j) 733  (0.8396 + 0.8832j)  (0.4838 − 1.4363j)  (1.0561 + 0.0601j) 734  (0.9681 + 0.3202j) (−0.4838 + 1.4363j) (1.0561 + 1.228j) 735  (0.8756 + 0.7423j) (−0.4838 − 1.4363j)  (1.0561 + 1.4486j) 736  (0.7564 + 0.0581j)  (0.6607 + 0.0514j)  (0.9201 − 0.3051j) 737  (0.7053 + 1.1983j)  (0.6607 − 0.0514j)  (0.9201 − 0.3045j) 738  (0.7309 + 0.4158j) (−0.6607 + 0.0514j)  (0.9201 − 0.7193j) 739  (0.7138 + 0.5587j) (−0.6607 − 0.0514j)  (0.9201 − 0.7851j) 740  (1.1628 + 0.0706j)  (0.6602 + 0.0461j)  (0.9201 + 0.3039j) 741  (0.8686 + 1.2002j)  (0.6602 − 0.0461j)  (0.9201 + 0.3027j) 742  (1.0982 + 0.4839j) (−0.6602 + 0.0461j)  (0.9201 + 0.7189j) 743  (1.0677 + 0.6266j) (−0.6602 − 0.0461j)  (0.9201 + 0.7866j) 744  (0.8457 + 0.0608j)  (0.1171 + 0.6262j)  (0.9201 − 0.4316j) 745 (0.6732 + 1.335j)  (0.1171 − 0.6262j)  (0.9201 − 0.4374j) 746  (0.803 + 0.4271j) (−0.1171 + 0.6262j)  (0.9201 − 0.5905j) 747  (0.7832 + 0.5618j) (−0.1171 − 0.6262j)  (0.9201 − 0.5662j) 748  (0.9769 + 0.0649j)  (0.0496 + 0.6408j)  (0.9201 + 0.4309j) 749  (1.0787 + 1.5235j)  (0.0496 − 0.6408j)  (0.9201 + 0.4375j) 750  (0.9336 + 0.4458j) (−0.0496 + 0.6408j)  (0.9201 + 0.5905j) 751  (0.9033 + 0.5861j) (−0.0496 − 0.6408j)  (0.9201 + 0.5676j) 752  (0.756 + 0.0579j)  (1.5854 + 0.2423j)  (0.9201 − 0.1795j) 753  (0.6833 + 1.1387j)  (1.5854 − 0.2423j)  (0.9201 − 0.1792j) 754  (0.7302 + 0.4161j) (−1.5854 + 0.2423j)  (0.9201 − 1.0559j) 755  (0.7097 + 0.5568j) (−1.5854 − 0.2423j) (0.9201 − 0.919j) 756  (1.1158 + 0.0685j)  (1.6031 + 0.0814j)  (0.9201 + 0.1794j) 757  (0.9888 + 1.2766j)  (1.6031 − 0.0814j)  (0.9201 + 0.1796j) 758  (1.0607 + 0.4725j) (−1.6031 + 0.0814j)  (0.9201 + 1.0561j) 759  (1.0274 + 0.6189j) (−1.6031 − 0.0814j)  (0.9201 + 0.9201j) 760  (0.8466 + 0.0606j)  (0.2051 + 1.4802j)  (0.9201 − 0.0609j) 761  (0.6926 + 1.4691j)  (0.2051 − 1.4802j)  (0.9201 − 0.0607j) 762  (0.8017 + 0.4262j) (−0.2051 + 1.4802j)  (0.9201 − 1.2271j) 763  (0.7827 + 0.5603j) (−0.2051 − 1.4802j)  (0.9201 − 1.4453j) 764  (0.9963 + 0.0648j)  (0.0679 + 1.4881j)  (0.9201 + 0.0601j) 765  (0.8816 + 1.4415j)  (0.0679 − 1.4881j)  (0.9201 + 0.0601j) 766  (0.9456 + 0.4497j) (−0.0679 + 1.4881j) (0.9201 + 1.228j) 767  (0.9113 + 0.5881j) (−0.0679 − 1.4881j)  (0.9201 + 1.4486j) 768 (−0.6256 − 0.166j)   (0.7488 + 0.3906j) (−0.0609 − 0.3051j) 769 (−0.5474 − 0.9834j)  (0.7488 − 0.3906j) (−0.0609 − 0.3045j) 770 (−0.6184 − 0.2849j) (−0.7488 + 0.3906j) (−0.0609 − 0.7193j) 771 (−0.5681 − 0.6794j) (−0.7488 − 0.3906j) (−0.0609 − 0.7851j) 772 (−1.2913 − 0.2246j)  (0.7767 + 0.3382j) (−0.0609 + 0.3039j) 773  (−1.035 − 0.9873j)  (0.7767 − 0.3382j) (−0.0609 + 0.3027j) 774 (−1.2698 − 0.3685j) (−0.7767 + 0.3382j) (−0.0609 + 0.7189j) 775 (−1.1142 − 0.8464j) (−0.7767 − 0.3382j) (−0.0609 + 0.7866j) 776 (−0.5875 − 0.1646j)  (0.4634 + 0.6444j) (−0.0609 − 0.4316j) 777 (−0.5563 − 0.8753j)  (0.4634 − 0.6444j) (−0.0609 − 0.4374j) 778  (−0.583 − 0.2827j) (−0.4634 + 0.6444j) (−0.0609 − 0.5905j) 779 (−0.5579 − 0.7479j) (−0.4634 − 0.6444j) (−0.0609 − 0.5662j) 780 (−1.7885 − 0.2939j)  (0.4078 + 0.6678j) (−0.0609 + 0.4309j) 781 (−1.3136 − 1.3361j)  (0.4078 − 0.6678j) (−0.0609 + 0.4375j) 782 (−1.7635 − 0.4945j) (−0.4078 + 0.6678j) (−0.0609 + 0.5905j) 783 (−1.4937 − 1.1225j) (−0.4078 − 0.6678j) (−0.0609 + 0.5676j) 784 (−0.6267 − 0.1653j) (0.8177 + 0.448j) (−0.0609 − 0.1795j) 785 (−0.5464 − 1.0029j) (0.8177 − 0.448j) (−0.0609 − 0.1792j) 786 (−0.6193 − 0.2836j) (−0.8177 + 0.448j)  (−0.0609 − 1.0559j) 787 (−0.5689 − 0.6802j) (−0.8177 − 0.448j)  (−0.0609 − 0.919j)  788 (−1.4137 − 0.2389j)  (0.8572 + 0.3768j) (−0.0609 + 0.1794j) 789 (−1.0985 − 1.058j)   (0.8572 − 0.3768j) (−0.0609 + 0.1796j) 790 (−1.3895 − 0.3958j) (−0.8572 + 0.3768j) (−0.0609 + 1.0561j) 791 (−1.2108 − 0.8839j) (−0.8572 − 0.3768j) (−0.0609 + 0.9201j) 792 (−0.5871 − 0.1654j) (0.5015 + 0.731j) (−0.0609 − 0.0609j) 793 (−0.5561 − 0.8731j) (0.5015 − 0.731j) (−0.0609 − 0.0607j) 794 (−0.5811 − 0.2835j) (−0.5015 + 0.731j)  (−0.0609 − 1.2271j) 795 (−0.5589 − 0.7479j) (−0.5015 − 0.731j)  (−0.0609 − 1.4453j) 796  (−1.581 − 0.2621j)  (0.4301 + 0.7622j) (−0.0609 + 0.0601j) 797 (−1.2327 − 1.1487j)  (0.4301 − 0.7622j) (−0.0609 + 0.0601j) 798 (−1.5528 − 0.4392j) (−0.4301 + 0.7622j) (−0.0609 + 1.228j)  799 (−1.3336 − 0.9755j) (−0.4301 − 0.7622j) (−0.0609 + 1.4486j) 800 (−0.6283 − 0.057j)   (0.6917 + 0.4713j) (−0.0607 − 0.3051j) 801 (−0.5295 − 1.1829j)  (0.6917 − 0.4713j) (−0.0607 − 0.3045j) 802 (−0.6074 − 0.4048j) (−0.6917 + 0.4713j) (−0.0607 − 0.7193j) 803  (−0.583 − 0.5511j) (−0.6917 − 0.4713j) (−0.0607 − 0.7851j) 804 (−1.3003 − 0.0721j)  (0.6571 + 0.5102j) (−0.0607 + 0.3039j) 805 (−0.1253 − 1.8671j)  (0.6571 − 0.5102j) (−0.0607 + 0.3027j) 806 (−1.2376 − 0.5163j) (−0.6571 + 0.5102j) (−0.0607 + 0.7189j) 807 (−1.1975 − 0.6706j) (−0.6571 − 0.5102j) (−0.0607 + 0.7866j) 808 (−0.5886 − 0.057j)   (0.5438 + 0.5982j) (−0.0607 − 0.4316j) 809 (−0.5136 − 1.3286j)  (0.5438 − 0.5982j) (−0.0607 − 0.4374j) 810 (−0.5758 − 0.4065j) (−0.5438 + 0.5982j) (−0.0607 − 0.5905j) 811 (−0.5611 − 0.527j)  (−0.5438 − 0.5982j) (−0.0607 − 0.5662j) 812  (−1.802 − 0.0992j)  (0.585 + 0.571j) (−0.0607 + 0.4309j) 813 (−0.8263 − 1.7115j)  (0.585 − 0.571j) (−0.0607 + 0.4375j) 814 (−1.7001 − 0.701j)  (−0.585 + 0.571j) (−0.0607 + 0.5905j) 815 (−1.6146 − 0.9089j) (−0.585 − 0.571j) (−0.0607 + 0.5676j) 816 (−0.6294 − 0.0568j)  (0.7628 + 0.5255j) (−0.0607 − 0.1795j) 817 (−0.5374 − 1.1319j)  (0.7628 − 0.5255j) (−0.0607 − 0.1792j) 818 (−0.6086 − 0.4059j) (−0.7628 + 0.5255j) (−0.0607 − 1.0559j) 819 (−0.5828 − 0.5502j) (−0.7628 − 0.5255j) (−0.0607 − 0.919j)  820 (−1.4203 − 0.0815j)  (0.711 + 0.5843j) (−0.0607 + 0.1794j) 821 (−0.3766 − 1.8088j)  (0.711 − 0.5843j) (−0.0607 + 0.1796j) 822 (−1.3503 − 0.5573j)  (−0.711 + 0.5843j) (−0.0607 + 1.0561j) 823 (−1.2881 − 0.7205j)  (−0.711 − 0.5843j) (−0.0607 + 0.9201j) 824 (−0.5888 − 0.0581j)  (0.5802 + 0.6879j) (−0.0607 − 0.0609j) 825 (−0.4902 − 1.4819j)  (0.5802 − 0.6879j) (−0.0607 − 0.0607j) 826 (−0.5798 − 0.4071j) (−0.5802 + 0.6879j) (−0.0607 − 1.2271j) 827  (−0.565 − 0.5268j) (−0.5802 − 0.6879j) (−0.0607 − 1.4453j) 828 (−1.5922 − 0.0884j)  (0.6418 + 0.6455j) (−0.0607 + 0.0601j) 829 (−0.5607 − 1.6779j)  (0.6418 − 0.6455j) (−0.0607 + 0.0601j) 830 (−1.5069 − 0.6219j) (−0.6418 + 0.6455j) (−0.0607 + 1.228j)  831 (−1.4334 − 0.8025j) (−0.6418 − 0.6455j) (−0.0607 + 1.4486j) 832 (−0.7537 − 0.1707j)  (0.5574 + 0.2288j) (−1.2271 − 0.3051j) 833 (−0.6934 − 1.0026j)  (0.5574 − 0.2288j) (−1.2271 − 0.3045j) 834 (−0.7479 − 0.2934j) (−0.5574 + 0.2288j) (−1.2271 − 0.7193j) 835 (−0.6935 − 0.6815j) (−0.5574 − 0.2288j) (−1.2271 − 0.7851j) 836 (−1.1595 − 0.2059j)  (0.5589 + 0.2277j) (−1.2271 + 0.3039j) 837 (−0.8948 − 1.0294j)  (0.5589 − 0.2277j) (−1.2271 + 0.3027j) 838 (−1.1381 − 0.3446j) (−0.5589 + 0.2277j) (−1.2271 + 0.7189j) 839 (−1.0186 − 0.7744j) (−0.5589 − 0.2277j) (−1.2271 + 0.7866j) 840 (−0.8475 − 0.1783j)  (0.3498 + 0.4641j) (−1.2271 − 0.4316j) 841 (−0.7045 − 0.8734j)  (0.3498 − 0.4641j) (−1.2271 − 0.4374j) 842 (−0.8329 − 0.3009j) (−0.3498 + 0.4641j) (−1.2271 − 0.5905j) 843 (−0.7305 − 0.7316j) (−0.3498 − 0.4641j) (−1.2271 − 0.5662j) 844  (−0.971 − 0.1881j)  (0.336 + 0.4751j) (−1.2271 + 0.4309j) 845 (−0.8488 − 0.8824j)  (0.336 − 0.4751j) (−1.2271 + 0.4375j) 846 (−0.9554 − 0.3139j)  (−0.336 + 0.4751j) (−1.2271 + 0.5905j) 847  (−0.872 − 0.7431j)  (−0.336 − 0.4751j) (−1.2271 + 0.5676j) 848 (−0.7549 − 0.1699j)  (1.4992 + 0.9395j) (−1.2271 − 0.1795j) 849 (−0.7024 − 1.0223j)  (1.4992 − 0.9395j) (−1.2271 − 0.1792j) 850 (−0.7469 − 0.2895j) (−1.4992 + 0.9395j) (−1.2271 − 1.0559j) 851  (−0.689 − 0.6783j) (−1.4992 − 0.9395j) (−1.2271 − 0.919j)  852 (−1.1088 − 0.1984j) (1.5913 + 0.785j) (−1.2271 + 0.1794j) 853 (−0.8629 − 1.0112j) (1.5913 − 0.785j) (−1.2271 + 0.1796j) 854 (−1.0899 − 0.3349j) (−1.5913 + 0.785j)  (−1.2271 + 1.0561j) 855 (−0.9908 − 0.7546j) (−1.5913 − 0.785j)  (−1.2271 + 0.9201j) 856 (−0.8433 − 0.1773j)  (0.8423 + 1.5041j) (−1.2271 − 0.0609j) 857 (−0.7058 − 0.8765j)  (0.8423 − 1.5041j) (−1.2271 − 0.0607j) 858 (−0.8266 − 0.2979j) (−0.8423 + 1.5041j) (−1.2271 − 1.2271j) 859  (−0.73 − 0.7316j) (−0.8423 − 1.5041j) (−1.2271 − 1.4453j) 860 (−0.9927 − 0.1926j) (0.6877 + 1.567j) (−1.2271 + 0.0601j) 861  (−0.84 − 0.8821j) (0.6877 − 1.567j) (−1.2271 + 0.0601j) 862 (−0.9678 − 0.3174j) (−0.6877 + 1.567j)  (−1.2271 + 1.228j)  863 (−0.8811 − 0.7424j) (−0.6877 − 1.567j)  (−1.2271 + 1.4486j) 864 (−0.7615 − 0.0593j)  (0.5019 + 0.2772j) (−1.4453 − 0.3051j) 865 (−0.7113 − 1.2017j)  (0.5019 − 0.2772j) (−1.4453 − 0.3045j) 866 (−0.7358 − 0.4169j) (−0.5019 + 0.2772j) (−1.4453 − 0.7193j) 867 (−0.7111 − 0.5569j) (−0.5019 − 0.2772j) (−1.4453 − 0.7851j) 868 (−1.1714 − 0.0711j)  (0.5006 + 0.2783j) (−1.4453 + 0.3039j) 869 (−0.8677 − 1.2003j)  (0.5006 − 0.2783j) (−1.4453 + 0.3027j) 870 (−1.1082 − 0.4852j) (−0.5006 + 0.2783j) (−1.4453 + 0.7189j) 871 (−1.0697 − 0.6262j) (−0.5006 − 0.2783j) (−1.4453 + 0.7866j) 872  (−0.849 − 0.0622j) (0.4263 + 0.391j) (−1.4453 − 0.4316j) 873 (−0.6719 − 1.3322j) (0.4263 − 0.391j) (−1.4453 − 0.4374j) 874 (−0.8073 − 0.4268j) (−0.4263 + 0.391j)  (−1.4453 − 0.5905j) 875  (−0.785 − 0.5627j) (−0.4263 − 0.391j)  (−1.4453 − 0.5662j) 876 (−0.9819 − 0.0652j)  (0.4317 + 0.3838j) (−1.4453 + 0.4309j) 877  (−1.082 − 1.5252j)  (0.4317 − 0.3838j) (−1.4453 + 0.4375j) 878 (−0.9394 − 0.449j)  (−0.4317 + 0.3838j) (−1.4453 + 0.5905j) 879  (−0.907 − 0.5883j) (−0.4317 − 0.3838j) (−1.4453 + 0.5676j) 880  (−0.759 − 0.0587j)  (1.3915 + 1.0821j) (−1.4453 − 0.1795j) 881 (−0.6864 − 1.1427j)  (1.3915 − 1.0821j) (−1.4453 − 0.1792j) 882 (−0.7315 − 0.4169j) (−1.3915 + 1.0821j) (−1.4453 − 1.0559j) 883  (−0.709 − 0.5576j) (−1.3915 − 1.0821j) (−1.4453 − 0.919j)  884 (−1.1186 − 0.0679j)  (1.2693 + 1.2108j) (−1.4453 + 0.1794j) 885 (−0.9889 − 1.2742j)  (1.2693 − 1.2108j) (−1.4453 + 0.1796j) 886 (−1.0622 − 0.4685j) (−1.2693 + 1.2108j) (−1.4453 + 1.0561j) 887 (−1.0334 − 0.6182j) (−1.2693 − 1.2108j) (−1.4453 + 0.9201j) 888 (−0.8496 − 0.0607j)  (0.9921 + 1.4233j) (−1.4453 − 0.0609j) 889 (−0.6982 − 1.4703j)  (0.9921 − 1.4233j) (−1.4453 − 0.0607j) 890 (−0.8022 − 0.4245j) (−0.9921 + 1.4233j) (−1.4453 − 1.2271j) 891 (−0.7856 − 0.563j)  (−0.9921 − 1.4233j) (−1.4453 − 1.4453j) 892  (−0.997 − 0.0646j)  (1.1356 + 1.3257j) (−1.4453 + 0.0601j) 893 (−0.8802 − 1.4371j)  (1.1356 − 1.3257j) (−1.4453 + 0.0601j) 894 (−0.9454 − 0.4482j) (−1.1356 + 1.3257j) (−1.4453 + 1.228j)  895 (−0.9139 − 0.5896j) (−1.1356 − 1.3257j) (−1.4453 + 1.4486j) 896 (0.6243 − 0.165j)  (0.6883 + 0.3373j)  (0.0601 − 0.3051j) 897 (0.5469 − 0.985j)  (0.6883 − 0.3373j)  (0.0601 − 0.3045j) 898  (0.6164 − 0.2812j) (−0.6883 + 0.3373j)  (0.0601 − 0.7193j) 899  (0.567 − 0.6809j) (−0.6883 − 0.3373j)  (0.0601 − 0.7851j) 900  (1.2933 − 0.2212j)  (0.7047 + 0.3065j)  (0.0601 + 0.3039j) 901  (1.0332 − 0.9826j)  (0.7047 − 0.3065j)  (0.0601 + 0.3027j) 902 (1.2676 − 0.367j) (−0.7047 + 0.3065j)  (0.0601 + 0.7189j) 903 (1.1144 − 0.843j) (−0.7047 − 0.3065j)  (0.0601 + 0.7866j) 904  (0.5868 − 0.1642j)  (0.4317 + 0.5823j)  (0.0601 − 0.4316j) 905  (0.5543 − 0.8737j)  (0.4317 − 0.5823j)  (0.0601 − 0.4374j) 906  (0.5826 − 0.2806j) (−0.4317 + 0.5823j)  (0.0601 − 0.5905j) 907  (0.559 − 0.7455j) (−0.4317 − 0.5823j)  (0.0601 − 0.5662j) 908  (1.7864 − 0.2881j) (0.3919 + 0.607j)  (0.0601 + 0.4309j) 909  (1.3108 − 1.3372j) (0.3919 − 0.607j)  (0.0601 + 0.4375j) 910  (1.7507 − 0.4867j) (−0.3919 + 0.607j)   (0.0601 + 0.5905j) 911  (1.4991 − 1.1213j) (−0.3919 − 0.607j)   (0.0601 + 0.5676j) 912 (0.6234 − 0.165j)  (0.8852 + 0.4995j)  (0.0601 − 0.1795j) 913  (0.547 − 1.0016j)  (0.8852 − 0.4995j)  (0.0601 − 0.1792j) 914  (0.6178 − 0.2811j) (−0.8852 + 0.4995j)  (0.0601 − 1.0559j) 915  (0.567 − 0.6783j) (−0.8852 − 0.4995j) (0.0601 − 0.919j) 916  (1.412 − 0.2345j)  (0.9323 + 0.4173j)  (0.0601 + 0.1794j) 917  (1.0937 − 1.0549j)  (0.9323 − 0.4173j)  (0.0601 + 0.1796j) 918  (1.3864 − 0.3933j) (−0.9323 + 0.4173j)  (0.0601 + 1.0561j) 919  (1.2033 − 0.8786j) (−0.9323 − 0.4173j)  (0.0601 + 0.9201j) 920  (0.5885 − 0.1642j)  (0.5331 + 0.8095j)  (0.0601 − 0.0609j) 921  (0.5545 − 0.8725j)  (0.5331 − 0.8095j)  (0.0601 − 0.0607j) 922  (0.5815 − 0.2807j) (−0.5331 + 0.8095j)  (0.0601 − 1.2271j) 923  (0.5548 − 0.7451j) (−0.5331 − 0.8095j)  (0.0601 − 1.4453j) 924  (1.5774 − 0.2573j)  (0.4495 + 0.8419j)  (0.0601 + 0.0601j) 925  (1.2284 − 1.1433j)  (0.4495 − 0.8419j)  (0.0601 + 0.0601j) 926  (1.5511 − 0.4361j) (−0.4495 + 0.8419j) (0.0601 + 1.228j) 927  (1.3354 − 0.9773j) (−0.4495 − 0.8419j)  (0.0601 + 1.4486j) 928  (0.6283 − 0.0558j)  (0.6247 + 0.4193j)  (0.0601 − 0.3051j) 929  (0.5291 − 1.1819j)  (0.6247 − 0.4193j)  (0.0601 − 0.3045j) 930 (0.6051 − 0.402j) (−0.6247 + 0.4193j)  (0.0601 − 0.7193j) 931  (0.5814 − 0.5448j) (−0.6247 − 0.4193j)  (0.0601 − 0.7851j) 932  (1.2999 − 0.0712j)  (0.6061 + 0.4389j)  (0.0601 + 0.3039j) 933  (0.1369 − 1.8677j)  (0.6061 − 0.4389j)  (0.0601 + 0.3027j) 934 (1.2418 − 0.516j) (−0.6061 + 0.4389j)  (0.0601 + 0.7189j) 935  (1.1902 − 0.6679j) (−0.6061 − 0.4389j)  (0.0601 + 0.7866j) 936  (0.5873 − 0.0559j)  (0.511 + 0.5228j)  (0.0601 − 0.4316j) 937  (0.5173 − 1.3265j)  (0.511 − 0.5228j)  (0.0601 − 0.4374j) 938  (0.5751 − 0.4014j)  (−0.511 + 0.5228j)  (0.0601 − 0.5905j) 939 (0.5636 − 0.528j)  (−0.511 − 0.5228j)  (0.0601 − 0.5662j) 940 (1.7981 − 0.093j) (0.5344 + 0.505j)  (0.0601 + 0.4309j) 941  (0.8308 − 1.7184j) (0.5344 − 0.505j)  (0.0601 + 0.4375j) 942  (1.7005 − 0.6966j) (−0.5344 + 0.505j)   (0.0601 + 0.5905j) 943  (1.6087 − 0.9062j) (−0.5344 − 0.505j)   (0.0601 + 0.5676j) 944  (0.6268 − 0.0558j)  (0.8281 + 0.5806j)  (0.0601 − 0.1795j) 945  (0.5414 − 1.1347j)  (0.8281 − 0.5806j)  (0.0601 − 0.1792j) 946  (0.6059 − 0.4021j) (−0.8281 + 0.5806j)  (0.0601 − 1.0559j) 947 (0.5805 − 0.547j) (−0.8281 − 0.5806j) (0.0601 − 0.919j) 948  (1.4178 − 0.0771j)  (0.7656 + 0.6506j)  (0.0601 + 0.1794j) 949 (0.3826 − 1.813j)  (0.7656 − 0.6506j)  (0.0601 + 0.1796j) 950  (1.3484 − 0.5553j) (−0.7656 + 0.6506j)  (0.0601 + 1.0561j) 951  (1.2836 − 0.7204j) (−0.7656 − 0.6506j)  (0.0601 + 0.9201j) 952 (0.5857 − 0.055j)  (0.6173 + 0.7664j)  (0.0601 − 0.0609j) 953  (0.4961 − 1.4846j)  (0.6173 − 0.7664j)  (0.0601 − 0.0607j) 954  (0.5773 − 0.4005j) (−0.6173 + 0.7664j)  (0.0601 − 1.2271j) 955  (0.5643 − 0.5263j) (−0.6173 − 0.7664j)  (0.0601 − 1.4453j) 956  (1.5788 − 0.0837j)  (0.6923 + 0.7149j)  (0.0601 + 0.0601j) 957 (0.5694 − 1.686j)  (0.6923 − 0.7149j)  (0.0601 + 0.0601j) 958  (1.4996 − 0.6152j) (−0.6923 + 0.7149j) (0.0601 + 1.228j) 959 (1.4303 − 0.8j)  (−0.6923 − 0.7149j)  (0.0601 + 1.4486j) 960  (0.7516 − 0.1684j) (0.6194 + 0.279j)  (1.228 − 0.3051j) 961  (0.6934 − 0.9988j) (0.6194 − 0.279j)  (1.228 − 0.3045j) 962  (0.7419 − 0.2872j) (−0.6194 + 0.279j)   (1.228 − 0.7193j) 963  (0.6901 − 0.6786j) (−0.6194 − 0.279j)   (1.228 − 0.7851j) 964  (1.1588 − 0.2042j)  (0.6253 + 0.2698j)  (1.228 + 0.3039j) 965  (0.9018 − 1.0284j)  (0.6253 − 0.2698j)  (1.228 + 0.3027j) 966  (1.135 − 0.3413j) (−0.6253 + 0.2698j)  (1.228 + 0.7189j) 967  (1.0117 − 0.7674j) (−0.6253 − 0.2698j)  (1.228 + 0.7866j) 968  (0.8433 − 0.1752j)  (0.3796 + 0.5044j)  (1.228 − 0.4316j) 969  (0.7021 − 0.8721j)  (0.3796 − 0.5044j)  (1.228 − 0.4374j) 970  (0.8268 − 0.2959j) (−0.3796 + 0.5044j)  (1.228 − 0.5905j) 971  (0.7323 − 0.7298j) (−0.3796 − 0.5044j)  (1.228 − 0.5662j) 972  (0.9716 − 0.1854j)  (0.3557 + 0.5188j)  (1.228 + 0.4309j) 973  (0.8465 − 0.8771j)  (0.3557 − 0.5188j)  (1.228 + 0.4375j) 974  (0.9546 − 0.3122j) (−0.3557 + 0.5188j)  (1.228 + 0.5905j) 975  (0.8752 − 0.7432j) (−0.3557 − 0.5188j)  (1.228 + 0.5676j) 976  (0.7521 − 0.1687j) (1.3509 + 0.837j)  (1.228 − 0.1795j) 977  (0.6996 − 1.0164j) (1.3509 − 0.837j)  (1.228 − 0.1792j) 978  (0.7454 − 0.2889j) (−1.3509 + 0.837j)   (1.228 − 1.0559j) 979  (0.6881 − 0.6803j) (−1.3509 − 0.837j)   (1.228 − 0.919j) 980  (1.1025 − 0.1974j)  (1.4337 + 0.6993j)  (1.228 + 0.1794j) 981  (0.8613 − 1.0075j)  (1.4337 − 0.6993j)  (1.228 + 0.1796j) 982 (1.0905 − 0.333j) (−1.4337 + 0.6993j)  (1.228 + 1.0561j) 983  (0.9886 − 0.7498j) (−1.4337 − 0.6993j)  (1.228 + 0.9201j) 984  (0.844 − 0.1753j)  (0.7641 + 1.3398j)  (1.228 − 0.0609j) 985  (0.7042 − 0.8704j)  (0.7641 − 1.3398j)  (1.228 − 0.0607j) 986  (0.8241 − 0.2959j) (−0.7641 + 1.3398j)  (1.228 − 1.2271j) 987  (0.7293 − 0.7284j) (−0.7641 − 1.3398j)  (1.228 − 1.4453j) 988  (0.9853 − 0.1875j)  (0.6248 + 1.3957j)  (1.228 + 0.0601j) 989  (0.8402 − 0.8791j)  (0.6248 − 1.3957j)  (1.228 + 0.0601j) 990  (0.9675 − 0.3141j) (−0.6248 + 1.3957j)  (1.228 + 1.228j) 991  (0.8821 − 0.7432j) (−0.6248 − 1.3957j)  (1.228 + 1.4486j) 992  (0.758 − 0.0568j)  (0.555 + 0.3523j)  (1.4486 − 0.3051j) 993  (0.7116 − 1.1997j)  (0.555 − 0.3523j)  (1.4486 − 0.3045j) 994  (0.7289 − 0.4142j)  (−0.555 + 0.3523j)  (1.4486 − 0.7193j) 995  (0.7109 − 0.5574j)  (−0.555 − 0.3523j)  (1.4486 − 0.7851j) 996  (1.1685 − 0.0674j) (0.5483 + 0.357j)  (1.4486 + 0.3039j) 997  (0.8699 − 1.1981j) (0.5483 − 0.357j)  (1.4486 + 0.3027j) 998  (1.1063 − 0.4788j) (−0.5483 + 0.357j)   (1.4486 + 0.7189j) 999  (1.0665 − 0.6214j) (−0.5483 − 0.357j)   (1.4486 + 0.7866j) 1000  (0.8509 − 0.0599j)  (0.4626 + 0.4325j)  (1.4486 − 0.4316j) 1001  (0.6789 − 1.3376j)  (0.4626 − 0.4325j)  (1.4486 − 0.4374j) 1002  (0.8082 − 0.4231j) (−0.4626 + 0.4325j)  (1.4486 − 0.5905j) 1003  (0.7847 − 0.5571j) (−0.4626 − 0.4325j)  (1.4486 − 0.5662j) 1004  (0.9808 − 0.0636j)  (0.4723 + 0.4235j)  (1.4486 + 0.4309j) 1005 (1.0845 − 1.525j)  (0.4723 − 0.4235j)  (1.4486 + 0.4375j) 1006  (0.935 − 0.4441j) (−0.4723 + 0.4235j)  (1.4486 + 0.5905j) 1007  (0.9018 − 0.5822j) (−0.4723 − 0.4235j)  (1.4486 + 0.5676j) 1008  (0.7563 − 0.0541j)  (1.2548 + 0.9637j)  (1.4486 − 0.1795j) 1009 (0.6846 − 1.137j)  (1.2548 − 0.9637j)  (1.4486 − 0.1792j) 1010  (0.732 − 0.4142j) (−1.2548 + 0.9637j)  (1.4486 − 1.0559j) 1011  (0.7126 − 0.5538j) (−1.2548 − 0.9637j) (1.4486 − 0.919j) 1012  (1.1128 − 0.0658j)  (1.1465 + 1.0787j)  (1.4486 + 0.1794j) 1013  (0.9928 − 1.2762j)  (1.1465 − 1.0787j)  (1.4486 + 0.1796j) 1014  (1.0595 − 0.4669j) (−1.1465 + 1.0787j)  (1.4486 + 1.0561j) 1015  (1.0277 − 0.6118j) (−1.1465 − 1.0787j)  (1.4486 + 0.9201j) 1016  (0.8491 − 0.0588j)  (0.8992 + 1.2679j)  (1.4486 − 0.0609j) 1017  (0.6995 − 1.4755j)  (0.8992 − 1.2679j)  (1.4486 − 0.0607j) 1018  (0.8088 − 0.4246j) (−0.8992 + 1.2679j)  (1.4486 − 1.2271j) 1019  (0.7788 − 0.5561j) (−0.8992 − 1.2679j)  (1.4486 − 1.4453j) 1020 (0.9928 − 0.062j)  (1.0275 + 1.1809j)  (1.4486 + 0.0601j) 1021  (0.881 − 1.4348j)  (1.0275 − 1.1809j)  (1.4486 + 0.0601j) 1022  (0.9463 − 0.4454j) (−1.0275 + 1.1809j) (1.4486 + 1.228j) 1023  (0.9131 − 0.5855j) (−1.0275 − 1.1809j)  (1.4486 + 1.4486j)

TABLE 9 An example of the bit-to-symbol mapping for 1024-ary non-uniform constellations from NN for code rate 4/5 Mapping NN_QSL NN_QSC NN_RSC 0  (0.0905 + 0.6153j)  (0.0412 + 0.8491j) (1.0626 + 1.0626j) 1  (0.0726 + 0.5304j)  (0.0412 − 0.8491j) (1.0626 − 0.3591j) 2  (−0.087 + 0.6142j) (−0.0412 + 0.8491j) (1.0626 + 1.1878j) 3 (−0.0705 + 0.5308j) (−0.0412 − 0.8491j) (1.0626 − 0.4301j) 4  (0.1512 + 0.6093j) (0.2881 + 0.81j)  (1.0626 − 1.058j)  5  (0.1337 + 0.5247j) (0.2881 − 0.81j)  (1.0626 − 0.7494j) 6 (−0.1463 + 0.6076j) (−0.2881 + 0.81j)  (1.0626 − 1.1847j) 7 (−0.1323 + 0.5167j) (−0.2881 − 0.81j)  (1.0626 − 0.6628j) 8  (0.1277 + 0.8468j)  (0.124 + 0.8429j) (1.0626 + 0.7523j) 9    (0.03 + 0.2228j)  (0.124 − 0.8429j) (1.0626 − 0.1607j) 10 (−0.1212 + 0.8513j)  (−0.124 + 0.8429j) (1.0626 + 0.6629j) 11 (−0.0377 + 0.2278j)  (−0.124 − 0.8429j) (1.0626 − 0.0944j) 12  (0.2087 + 0.8286j)  (0.2064 + 0.8301j) (1.0626 + 0.3594j) 13  (0.0751 + 0.2278j)  (0.2064 − 0.8301j) (1.0626 + 0.1597j) 14 (−0.2038 + 0.8338j) (−0.2064 + 0.8301j) (1.0626 + 0.4297j) 15 (−0.0805 + 0.2288j) (−0.2064 − 0.8301j) (1.0626 + 0.0937j) 16  (0.0329 + 0.6239j)  (0.0382 + 0.7703j) (1.0626 + 0.9504j) 17  (0.0283 + 0.5464j)  (0.0382 − 0.7703j) (1.0626 − 0.2918j) 18 (−0.0299 + 0.6233j) (−0.0382 + 0.7703j) (1.0626 + 1.3347j) 19 (−0.0246 + 0.5492j) (−0.0382 − 0.7703j) (1.0626 − 0.503j)  20  (0.2038 + 0.5925j)  (0.2647 + 0.7371j) (1.0626 − 0.946j)  21  (0.1759 + 0.5208j)  (0.2647 − 0.7371j) (1.0626 − 0.8449j) 22 (−0.2034 + 0.5935j) (−0.2647 + 0.7371j) (1.0626 − 1.331j)  23 (−0.1799 + 0.516j)  (−0.2647 − 0.7371j) (1.0626 − 0.5804j) 24  (0.0438 + 0.8551j)  (0.1142 + 0.7653j) (1.0626 + 0.8462j) 25  (0.0256 + 0.1565j)  (0.1142 − 0.7653j) (1.0626 − 0.2242j) 26 (−0.0406 + 0.8549j) (−0.1142 + 0.7653j) (1.0626 + 0.5805j) 27 (−0.0358 + 0.1574j) (−0.1142 − 0.7653j) (1.0626 − 0.0332j) 28  (0.2873 + 0.8036j)  (0.1901 + 0.7546j) (1.0626 + 0.2916j) 29  (0.0278 + 0.1041j)  (0.1901 − 0.7546j) (1.0626 + 0.2239j) 30  (−0.283 + 0.8097j) (−0.1901 + 0.7546j) (1.0626 + 0.5035j) 31 (−0.0364 + 0.1031j) (−0.1901 − 0.7546j) (1.0626 + 0.0328j) 32  (0.0851 − 0.6146j)  (0.0335 + 0.6142j) (−0.3591 + 1.0626j)  33  (0.0647 − 0.5301j)  (0.0335 − 0.6142j) (−0.3591 − 0.3591j)  34 (−0.0932 − 0.6134j) (−0.0335 + 0.6142j) (−0.3591 + 1.1878j)  35 (−0.0764 − 0.5278j) (−0.0335 − 0.6142j) (−0.3591 − 0.4301j)  36  (0.1436 − 0.6061j)  (0.2243 + 0.5872j) (−0.3591 − 1.058j)  37  (0.1253 − 0.5197j)  (0.2243 − 0.5872j) (−0.3591 − 0.7494j)  38 (−0.1581 − 0.6059j) (−0.2243 + 0.5872j) (−0.3591 − 1.1847j)  39 (−0.1414 − 0.5141j) (−0.2243 − 0.5872j) (−0.3591 − 0.6628j)  40  (0.1171 − 0.8463j)  (0.0983 + 0.6107j) (−0.3591 + 0.7523j)  41  (0.0244 − 0.2175j)  (0.0983 − 0.6107j) (−0.3591 − 0.1607j)  42 (−0.1323 − 0.8443j) (−0.0983 + 0.6107j) (−0.3591 + 0.6629j)  43 (−0.0377 − 0.2194j) (−0.0983 − 0.6107j) (−0.3591 − 0.0944j)  44  (0.1984 − 0.8274j)  (0.162 + 0.6012j) (−0.3591 + 0.3594j)  45  (0.0741 − 0.2254j)  (0.162 − 0.6012j) (−0.3591 + 0.1597j)  46 (−0.2126 − 0.8267j)  (−0.162 + 0.6012j) (−0.3591 + 0.4297j)  47 (−0.0802 − 0.2244j)  (−0.162 − 0.6012j) (−0.3591 + 0.0937j)  48 (0.0258 − 0.621j)  (0.0352 + 0.6922j) (−0.3591 + 0.9504j)  49  (0.0226 − 0.5432j)  (0.0352 − 0.6922j) (−0.3591 − 0.2918j)  50  (−0.039 − 0.6218j) (−0.0352 + 0.6922j) (−0.3591 + 1.3347j)  51 (−0.034 − 0.544j) (−0.0352 − 0.6922j) (−0.3591 − 0.503j)  52  (0.1967 − 0.5901j)  (0.2428 + 0.6632j) (−0.3591 − 0.946j)  53  (0.172 − 0.5162j)  (0.2428 − 0.6632j) (−0.3591 − 0.8449j)  54 (−0.2091 − 0.5878j) (−0.2428 + 0.6632j) (−0.3591 − 1.331j)  55 (−0.1838 − 0.518j)  (−0.2428 − 0.6632j) (−0.3591 − 0.5804j)  56  (0.0358 − 0.8517j)  (0.1057 + 0.6878j) (−0.3591 + 0.8462j)  57  (0.0265 − 0.1552j)  (0.1057 − 0.6878j) (−0.3591 − 0.2242j)  58  (−0.052 − 0.8529j) (−0.1057 + 0.6878j) (−0.3591 + 0.5805j)  59 (−0.0294 − 0.1497j) (−0.1057 − 0.6878j) (−0.3591 − 0.0332j)  60 (0.2811 − 0.799j)  (0.1754 + 0.6784j) (−0.3591 + 0.2916j)  61  (0.0225 − 0.1034j)  (0.1754 − 0.6784j) (−0.3591 + 0.2239j)  62 (−0.2913 − 0.8052j) (−0.1754 + 0.6784j) (−0.3591 + 0.5035j)  63 (−0.0353 − 0.1029j) (−0.1754 − 0.6784j) (−0.3591 + 0.0328j)  64  (0.6232 + 0.0923j)  (0.8497 + 0.0412j) (1.1878 + 1.0626j) 65  (0.5459 + 0.0722j)  (0.8497 − 0.0412j) (1.1878 − 0.3591j) 66 (−0.6279 + 0.0985j) (−0.8497 + 0.0412j) (1.1878 + 1.1878j) 67 (−0.5475 + 0.0765j) (−0.8497 − 0.0412j) (1.1878 − 0.4301j) 68  (0.6112 + 0.1529j)  (0.8102 + 0.2874j) (1.1878 − 1.058j)  69  (0.5327 + 0.1345j)  (0.8102 − 0.2874j) (1.1878 − 0.7494j) 70 (−0.6161 + 0.1549j) (−0.8102 + 0.2874j) (1.1878 − 1.1847j) 71 (−0.5353 + 0.1413j) (−0.8102 − 0.2874j) (1.1878 − 0.6628j) 72  (0.8437 + 0.1242j)  (0.8436 + 0.1238j) (1.1878 + 0.7523j) 73  (0.2464 + 0.0312j)  (0.8436 − 0.1238j) (1.1878 − 0.1607j) 74 (−0.8508 + 0.1338j) (−0.8436 + 0.1238j) (1.1878 + 0.6629j) 75 (−0.2532 + 0.0313j) (−0.8436 − 0.1238j) (1.1878 − 0.0944j) 76  (0.8236 + 0.2067j)  (0.8306 + 0.2059j) (1.1878 + 0.3594j) 77  (0.2607 + 0.0719j)  (0.8306 − 0.2059j) (1.1878 + 0.1597j) 78 (−0.8333 + 0.2169j) (−0.8306 + 0.2059j) (1.1878 + 0.4297j) 79 (−0.2658 + 0.0741j) (−0.8306 − 0.2059j) (1.1878 + 0.0937j) 80  (0.6317 + 0.0305j)  (0.771 + 0.0382j) (1.1878 + 0.9504j) 81  (0.5553 + 0.0285j)  (0.771 − 0.0382j) (1.1878 − 0.2918j) 82  (−0.637 + 0.0371j)  (−0.771 + 0.0382j) (1.1878 + 1.3347j) 83 (−0.5621 + 0.0301j)  (−0.771 − 0.0382j) (1.1878 − 0.503j)  84  (0.5893 + 0.2067j)  (0.7374 + 0.2643j) (1.1878 − 0.946j)  85 (0.5227 + 0.185j)  (0.7374 − 0.2643j) (1.1878 − 0.8449j) 86 (−0.5955 + 0.2141j) (−0.7374 + 0.2643j) (1.1878 − 1.331j)  87 (−0.5257 + 0.19j)  (−0.7374 − 0.2643j) (1.1878 − 0.5804j) 88  (0.852 + 0.0424j)  (0.7656 + 0.1141j) (1.1878 + 0.8462j) 89  (0.1783 + 0.0292j)  (0.7656 − 0.1141j) (1.1878 − 0.2242j) 90 (−0.8597 + 0.0457j) (−0.7656 + 0.1141j) (1.1878 + 0.5805j) 91 (−0.1895 + 0.0298j) (−0.7656 − 0.1141j) (1.1878 − 0.0332j) 92  (0.7982 + 0.2906j)  (0.7545 + 0.1894j) (1.1878 + 0.2916j) 93 (0.0291 + 0.03j)   (0.7545 − 0.1894j) (1.1878 + 0.2239j) 94 (−0.8039 + 0.2975j) (−0.7545 + 0.1894j) (1.1878 + 0.5035j) 95  (−0.034 + 0.0331j) (−0.7545 − 0.1894j) (1.1878 + 0.0328j) 96  (0.6194 − 0.0972j)  (0.6147 + 0.0331j) (−0.4301 + 1.0626j)  97 (0.5444 − 0.079j)  (0.6147 − 0.0331j) (−0.4301 − 0.3591j)  98 (−0.6257 − 0.0906j) (−0.6147 + 0.0331j) (−0.4301 + 1.1878j)  99 (−0.5454 − 0.0701j) (−0.6147 − 0.0331j) (−0.4301 − 0.4301j)  100 (0.6084 − 0.152j)  (0.5872 + 0.2241j) (−0.4301 − 1.058j)  101  (0.5262 − 0.1433j)  (0.5872 − 0.2241j) (−0.4301 − 0.7494j)  102 (−0.6127 − 0.1516j) (−0.5872 + 0.2241j) (−0.4301 − 1.1847j)  103 (−0.5334 − 0.1337j) (−0.5872 − 0.2241j) (−0.4301 − 0.6628j)  104  (0.8457 − 0.1252j)  (0.6108 + 0.0978j) (−0.4301 + 0.7523j)  105  (0.2492 − 0.0318j)  (0.6108 − 0.0978j) (−0.4301 − 0.1607j)  106 (−0.8508 − 0.1251j) (−0.6108 + 0.0978j) (−0.4301 + 0.6629j)  107 (−0.2563 − 0.0301j) (−0.6108 − 0.0978j) (−0.4301 − 0.0944j)  108  (0.825 − 0.2124j)  (0.6016 + 0.1618j) (−0.4301 + 0.3594j)  109  (0.263 − 0.0742j)  (0.6016 − 0.1618j) (−0.4301 + 0.1597j)  110 (−0.8349 − 0.2082j) (−0.6016 + 0.1618j) (−0.4301 + 0.4297j)  111 (−0.2674 − 0.0732j) (−0.6016 − 0.1618j) (−0.4301 + 0.0937j)  112  (0.6291 − 0.0356j)  (0.6928 + 0.0352j) (−0.4301 + 0.9504j)  113  (0.5543 − 0.0309j)  (0.6928 − 0.0352j) (−0.4301 − 0.2918j)  114 (−0.6409 − 0.0308j) (−0.6928 + 0.0352j) (−0.4301 + 1.3347j)  115 (−0.5606 − 0.0274j) (−0.6928 − 0.0352j) (−0.4301 − 0.503j)  116 (0.5908 − 0.212j)  (0.6636 + 0.2429j) (−0.4301 − 0.946j)  117 (0.5167 − 0.191j)  (0.6636 − 0.2429j) (−0.4301 − 0.8449j)  118 (−0.5935 − 0.2049j) (−0.6636 + 0.2429j) (−0.4301 − 1.331j)  119 (−0.5246 − 0.1834j) (−0.6636 − 0.2429j) (−0.4301 − 0.5804j)  120  (0.8559 − 0.0494j)  (0.6879 + 0.1053j) (−0.4301 + 0.8462j)  121  (0.1776 − 0.0275j)  (0.6879 − 0.1053j) (−0.4301 − 0.2242j)  122 (−0.8623 − 0.0413j) (−0.6879 + 0.1053j) (−0.4301 + 0.5805j)  123 (−0.1851 − 0.0237j) (−0.6879 − 0.1053j) (−0.4301 − 0.0332j)  124  (0.7951 − 0.2921j)  (0.6786 + 0.1752j) (−0.4301 + 0.2916j)  125  (0.0264 − 0.0314j)  (0.6786 − 0.1752j) (−0.4301 + 0.2239j)  126  (−0.808 − 0.2898j) (−0.6786 + 0.1752j) (−0.4301 + 0.5035j)  127 (−0.0306 − 0.0312j) (−0.6786 − 0.1752j) (−0.4301 + 0.0328j)  128  (0.3676 + 0.5027j)  (0.045 + 0.9288j) (−1.058 + 1.0626j) 129  (0.3226 + 0.4348j)  (0.045 − 0.9288j) (−1.058 − 0.3591j) 130 (−0.3679 + 0.509j)   (−0.045 + 0.9288j) (−1.058 + 1.1878j) 131 (−0.3184 + 0.44j)   (−0.045 − 0.9288j) (−1.058 − 0.4301j) 132  (0.317 + 0.537j) (0.3128 + 0.884j) (−1.058 − 1.058j)  133  (0.2673 + 0.4727j) (0.3128 − 0.884j) (−1.058 − 0.7494j) 134 (−0.3152 + 0.5441j) (−0.3128 + 0.884j)  (−1.058 − 1.1847j) 135 (−0.2634 + 0.4732j) (−0.3128 − 0.884j)  (−1.058 − 0.6628j) 136  (0.506 + 0.6853j)  (0.1346 + 0.9215j) (−1.058 + 0.7523j) 137  (0.1572 + 0.1746j)  (0.1346 − 0.9215j) (−1.058 − 0.1607j) 138 (−0.5018 + 0.691j)  (−0.1346 + 0.9215j) (−1.058 + 0.6629j) 139 (−0.1603 + 0.1732j) (−0.1346 − 0.9215j) (−1.058 − 0.0944j) 140  (0.4358 + 0.7315j)  (0.2242 + 0.9064j) (−1.058 + 0.3594j) 141  (0.1294 + 0.2023j)  (0.2242 − 0.9064j) (−1.058 + 0.1597j) 142 (−0.4324 + 0.7385j) (−0.2242 + 0.9064j) (−1.058 + 0.4297j) 143 (−0.1329 + 0.2047j) (−0.2242 − 0.9064j) (−1.058 + 0.0937j) 144  (0.4152 + 0.4649j)  (0.0488 + 1.0102j) (−1.058 + 0.9504j) 145  (0.3631 + 0.4052j)  (0.0488 − 1.0102j) (−1.058 − 0.2918j) 146 (−0.4097 + 0.467j)  (−0.0488 + 1.0102j) (−1.058 + 1.3347j) 147 (−0.3601 + 0.4096j) (−0.0488 − 1.0102j) (−1.058 − 0.503j)  148  (0.2622 + 0.5707j)  (0.3391 + 0.9595j) (−1.058 − 0.946j)  149  (0.2322 + 0.5018j)  (0.3391 − 0.9595j) (−1.058 − 0.8449j) 150 (−0.2606 + 0.5676j) (−0.3391 + 0.9595j) (−1.058 − 1.331j)  151 (−0.2348 + 0.4978j) (−0.3391 − 0.9595j) (−1.058 − 0.5804j) 152  (0.5726 + 0.6333j)  (0.1466 + 1.0017j) (−1.058 + 0.8462j) 153  (0.1106 + 0.1198j)  (0.1466 − 1.0017j) (−1.058 − 0.2242j) 154 (−0.5682 + 0.6409j) (−0.1466 + 1.0017j) (−1.058 + 0.5805j) 155 (−0.1178 + 0.1189j) (−0.1466 − 1.0017j) (−1.058 − 0.0332j) 156  (0.363 + 0.7757j)  (0.2434 + 0.9852j) (−1.058 + 0.2916j) 157  (0.0848 + 0.1073j)  (0.2434 − 0.9852j) (−1.058 + 0.2239j) 158  (−0.362 + 0.7788j) (−0.2434 + 0.9852j) (−1.058 + 0.5035j) 159 (−0.0912 + 0.1086j) (−0.2434 − 0.9852j) (−1.058 + 0.0328j) 160  (0.3606 − 0.5047j)  (0.0793 + 1.6276j) (−0.7494 + 1.0626j)  161  (0.3152 − 0.4353j)  (0.0793 − 1.6276j) (−0.7494 − 0.3591j)  162 (−0.3685 − 0.5011j) (−0.0793 + 1.6276j) (−0.7494 + 1.1878j)  163 (−0.3289 − 0.4324j) (−0.0793 − 1.6276j) (−0.7494 − 0.4301j)  164  (0.3093 − 0.5357j)  (0.5459 + 1.5384j) (−0.7494 − 1.058j)  165  (0.2589 − 0.4704j)  (0.5459 − 1.5384j) (−0.7494 − 0.7494j)  166 (−0.3208 − 0.5383j) (−0.5459 + 1.5384j) (−0.7494 − 1.1847j)  167 (−0.2715 − 0.4696j) (−0.5459 − 1.5384j) (−0.7494 − 0.6628j)  168  (0.4948 − 0.6925j)  (0.2373 + 1.6128j) (−0.7494 + 0.7523j)  169  (0.1516 − 0.1683j)  (0.2373 − 1.6128j) (−0.7494 − 0.1607j)  170 (−0.5073 − 0.6829j) (−0.2373 + 1.6128j) (−0.7494 + 0.6629j)  171 (−0.1608 − 0.1692j) (−0.2373 − 1.6128j) (−0.7494 − 0.0944j)  172  (0.426 − 0.7356j)  (0.393 + 1.5827j) (−0.7494 + 0.3594j)  173  (0.1227 − 0.2002j)  (0.393 − 1.5827j) (−0.7494 + 0.1597j)  174 (−0.4387 − 0.7317j)  (−0.393 + 1.5827j) (−0.7494 + 0.4297j)  175 (−0.1314 − 0.2024j)  (−0.393 − 1.5827j) (−0.7494 + 0.0937j)  176  (0.4079 − 0.4685j)  (0.0728 + 1.4962j) (−0.7494 + 0.9504j)  177  (0.3554 − 0.4091j)  (0.0728 − 1.4962j) (−0.7494 − 0.2918j)  178 (−0.4179 − 0.4629j) (−0.0728 + 1.4962j) (−0.7494 + 1.3347j)  179 (−0.3691 − 0.4064j) (−0.0728 − 1.4962j) (−0.7494 − 0.503j)  180  (0.2559 − 0.5654j)  (0.5026 + 1.4144j) (−0.7494 − 0.946j)  181  (0.2249 − 0.4937j)  (0.5026 − 1.4144j) (−0.7494 − 0.8449j)  182 (−0.2654 − 0.5672j) (−0.5026 + 1.4144j) (−0.7494 − 1.331j)  183 (−0.2352 − 0.4942j) (−0.5026 − 1.4144j) (−0.7494 − 0.5804j)  184 (0.5621 − 0.637j)  (0.218 + 1.4825j) (−0.7494 + 0.8462j)  185  (0.1105 − 0.1167j)  (0.218 − 1.4825j) (−0.7494 − 0.2242j)  186 (−0.5709 − 0.633j)   (−0.218 + 1.4825j) (−0.7494 + 0.5805j)  187 (−0.1167 − 0.1161j)  (−0.218 − 1.4825j) (−0.7494 − 0.0332j)  188  (0.3523 − 0.7731j)  (0.3615 + 1.4551j) (−0.7494 + 0.2916j)  189 (0.0869 − 0.107j)  (0.3615 − 1.4551j) (−0.7494 + 0.2239j)  190 (−0.3709 − 0.7752j) (−0.3615 + 1.4551j) (−0.7494 + 0.5035j)  191 (−0.0873 − 0.1019j) (−0.3615 − 1.4551j) (−0.7494 + 0.0328j)  192  (0.5017 + 0.3733j)  (0.9295 + 0.0448j) (−1.1847 + 1.0626j)  193  (0.433 + 0.3274j)  (0.9295 − 0.0448j) (−1.1847 − 0.3591j)  194 (−0.4996 + 0.3766j) (−0.9295 + 0.0448j) (−1.1847 + 1.1878j)  195 (−0.4365 + 0.3322j) (−0.9295 − 0.0448j) (−1.1847 − 0.4301j)  196  (0.5383 + 0.3214j)  (0.8841 + 0.3122j) (−1.1847 − 1.058j)  197  (0.4685 + 0.2775j)  (0.8841 − 0.3122j) (−1.1847 − 0.7494j)  198 (−0.5348 + 0.3258j) (−0.8841 + 0.3122j) (−1.1847 − 1.1847j)  199  (−0.471 + 0.2765j) (−0.8841 − 0.3122j) (−1.1847 − 0.6628j)  200  (0.6824 + 0.5069j)  (0.9223 + 0.1344j) (−1.1847 + 0.7523j)  201  (0.2041 + 0.1325j)  (0.9223 − 0.1344j) (−1.1847 − 0.1607j)  202 (−0.6791 + 0.5175j) (−0.9223 + 0.1344j) (−1.1847 + 0.6629j)  203 (−0.2045 + 0.132j)  (−0.9223 − 0.1344j) (−1.1847 − 0.0944j)  204  (0.731 + 0.4389j)  (0.9071 + 0.2239j) (−1.1847 + 0.3594j)  205  (0.2367 + 0.1203j)  (0.9071 − 0.2239j) (−1.1847 + 0.1597j)  206 (−0.7255 + 0.4463j) (−0.9071 + 0.2239j) (−1.1847 + 0.4297j)  207  (−0.237 + 0.1193j) (−0.9071 − 0.2239j) (−1.1847 + 0.0937j)  208  (0.4603 + 0.4175j)  (1.0112 + 0.0488j) (−1.1847 + 0.9504j)  209  (0.4063 + 0.3693j)  (1.0112 − 0.0488j) (−1.1847 − 0.2918j)  210 (−0.4607 + 0.4242j) (−1.0112 + 0.0488j) (−1.1847 + 1.3347j)  211 (−0.4028 + 0.3683j) (−1.0112 − 0.0488j) (−1.1847 − 0.503j)  212  (0.5655 + 0.2706j)  (0.9595 + 0.3387j) (−1.1847 − 0.946j)  213  (0.4972 + 0.2352j)  (0.9595 − 0.3387j) (−1.1847 − 0.8449j)  214 (−0.5663 + 0.2728j) (−0.9595 + 0.3387j) (−1.1847 − 1.331j)  215 (−0.4987 + 0.2352j) (−0.9595 − 0.3387j) (−1.1847 − 0.5804j)  216  (0.6282 + 0.5729j)  (1.0026 + 0.1464j) (−1.1847 + 0.8462j)  217  (0.1461 + 0.0614j)  (1.0026 − 0.1464j) (−1.1847 − 0.2242j)  218  (−0.629 + 0.5813j) (−1.0026 + 0.1464j) (−1.1847 + 0.5805j)  219 (−0.1499 + 0.0621j) (−1.0026 − 0.1464j) (−1.1847 − 0.0332j)  220  (0.7712 + 0.3678j)  (0.9858 + 0.2431j) (−1.1847 + 0.2916j)  221  (0.0864 + 0.0375j)  (0.9858 − 0.2431j) (−1.1847 + 0.2239j)  222 (−0.7709 + 0.3758j) (−0.9858 + 0.2431j) (−1.1847 + 0.5035j)  223 (−0.0946 + 0.037j)  (−0.9858 − 0.2431j) (−1.1847 + 0.0328j)  224  (0.4907 − 0.3721j)  (1.6285 + 0.0791j) (−0.6628 + 1.0626j)  225 (0.4272 − 0.327j)  (1.6285 − 0.0791j) (−0.6628 − 0.3591j)  226 (−0.5032 − 0.3732j) (−1.6285 + 0.0791j) (−0.6628 + 1.1878j)  227 (−0.4385 − 0.3286j) (−1.6285 − 0.0791j) (−0.6628 − 0.4301j)  228  (0.5296 − 0.3255j)  (1.5386 + 0.5469j) (−0.6628 − 1.058j)  229  (0.4632 − 0.2748j)  (1.5386 − 0.5469j) (−0.6628 − 0.7494j)  230 (−0.5388 − 0.3189j) (−1.5386 + 0.5469j) (−0.6628 − 1.1847j)  231 (−0.4755 − 0.2712j) (−1.5386 − 0.5469j) (−0.6628 − 0.6628j)  232 (0.6754 − 0.519j) (1.6131 + 0.237j) (−0.6628 + 0.7523j)  233  (0.1995 − 0.1273j) (1.6131 − 0.237j) (−0.6628 − 0.1607j)  234 (−0.6842 − 0.5066j) (−1.6131 + 0.237j)  (−0.6628 + 0.6629j)  235 (−0.2066 − 0.1312j) (−1.6131 − 0.237j)  (−0.6628 − 0.0944j)  236  (0.7211 − 0.4468j)  (1.583 + 0.3934j) (−0.6628 + 0.3594j)  237  (0.2335 − 0.1172j)  (1.583 − 0.3934j) (−0.6628 + 0.1597j)  238 (−0.7312 − 0.4415j)  (−1.583 + 0.3934j) (−0.6628 + 0.4297j)  239 (−0.2462 − 0.1171j)  (−1.583 − 0.3934j) (−0.6628 + 0.0937j)  240 (0.4558 − 0.424j)  (1.4969 + 0.0726j) (−0.6628 + 0.9504j)  241  (0.3981 − 0.3655j)  (1.4969 − 0.0726j) (−0.6628 − 0.2918j)  242 (−0.4676 − 0.4191j) (−1.4969 + 0.0726j) (−0.6628 + 1.3347j)  243 (−0.4098 − 0.369j)  (−1.4969 − 0.0726j) (−0.6628 − 0.503j)  244  (0.5637 − 0.2743j)  (1.4145 + 0.5032j) (−0.6628 − 0.946j)  245  (0.4938 − 0.2386j)  (1.4145 − 0.5032j) (−0.6628 − 0.8449j)  246  (−0.571 − 0.2635j) (−1.4145 + 0.5032j) (−0.6628 − 1.331j)  247 (−0.5007 − 0.2353j) (−1.4145 − 0.5032j) (−0.6628 − 0.5804j)  248  (0.6183 − 0.5836j)  (1.4829 + 0.2182j) (−0.6628 + 0.8462j)  249  (0.1465 − 0.0602j)  (1.4829 − 0.2182j) (−0.6628 − 0.2242j)  250 (−0.6288 − 0.5726j) (−1.4829 + 0.2182j) (−0.6628 + 0.5805j)  251 (−0.1548 − 0.0603j) (−1.4829 − 0.2182j) (−0.6628 − 0.0332j)  252  (0.763 − 0.3764j)  (1.4551 + 0.3617j) (−0.6628 + 0.2916j)  253  (0.085 − 0.0339j)  (1.4551 − 0.3617j) (−0.6628 + 0.2239j)  254 (−0.7748 − 0.3684j) (−1.4551 + 0.3617j) (−0.6628 + 0.5035j)  255 (−0.0927 − 0.0278j) (−1.4551 − 0.3617j) (−0.6628 + 0.0328j)  256  (0.1013 + 0.6984j)  (0.5869 + 0.6485j) (0.7523 + 1.0626j) 257  (0.0558 + 0.4624j)  (0.5869 − 0.6485j) (0.7523 − 0.3591j) 258 (−0.0963 + 0.7007j) (−0.5869 + 0.6485j) (0.7523 + 1.1878j) 259 (−0.0551 + 0.4603j) (−0.5869 − 0.6485j) (0.7523 − 0.4301j) 260  (0.169 + 0.6862j)  (0.3677 + 0.7819j) (0.7523 − 1.058j)  261  (0.1232 + 0.4492j)  (0.3677 − 0.7819j) (0.7523 − 0.7494j) 262 (−0.1643 + 0.6844j) (−0.3677 + 0.7819j) (0.7523 − 1.1847j) 263 (−0.1223 + 0.4513j) (−0.3677 − 0.7819j) (0.7523 − 0.6628j) 264  (0.1146 + 0.7745j)  (0.5188 + 0.7018j) (0.7523 + 0.7523j) 265  (0.0303 + 0.2988j)  (0.5188 − 0.7018j) (0.7523 − 0.1607j) 266 (−0.1078 + 0.7737j) (−0.5188 + 0.7018j) (0.7523 + 0.6629j) 267 (−0.0306 + 0.303j)  (−0.5188 − 0.7018j) (0.7523 − 0.0944j) 268  (0.1878 + 0.7561j)  (0.445 + 0.7463j) (0.7523 + 0.3594j) 269  (0.094 + 0.2936j)  (0.445 − 0.7463j) (0.7523 + 0.1597j) 270  (−0.186 + 0.7586j)  (−0.445 + 0.7463j) (0.7523 + 0.4297j) 271 (−0.0962 + 0.2893j)  (−0.445 − 0.7463j) (0.7523 + 0.0937j) 272  (0.0361 + 0.7022j)  (0.5389 + 0.5945j) (0.7523 + 0.9504j) 273  (0.0348 + 0.4317j)  (0.5389 − 0.5945j) (0.7523 − 0.2918j) 274 (−0.0312 + 0.7j)   (−0.5389 + 0.5945j) (0.7523 + 1.3347j) 275 (−0.0333 + 0.4266j) (−0.5389 − 0.5945j) (0.7523 − 0.503j)  276  (0.2349 + 0.6655j)  (0.338 + 0.7122j) (0.7523 − 0.946j)  277 (0.1304 + 0.415j)  (0.338 − 0.7122j) (0.7523 − 0.8449j) 278 (−0.2376 + 0.663j)   (−0.338 + 0.7122j) (0.7523 − 1.331j)  279 (−0.1281 + 0.4148j)  (−0.338 − 0.7122j) (0.7523 − 0.5804j) 280  (0.0396 + 0.7779j)  (0.4765 + 0.6415j) (0.7523 + 0.8462j) 281  (0.0355 + 0.3627j)  (0.4765 − 0.6415j) (0.7523 − 0.2242j) 282 (−0.0352 + 0.7793j) (−0.4765 + 0.6415j) (0.7523 + 0.5805j) 283 (−0.0391 + 0.361j)  (−0.4765 − 0.6415j) (0.7523 − 0.0332j) 284  (0.2594 + 0.7335j)  (0.4091 + 0.6803j) (0.7523 + 0.2916j) 285  (0.1071 + 0.3528j)  (0.4091 − 0.6803j) (0.7523 + 0.2239j) 286 (−0.2581 + 0.7369j) (−0.4091 + 0.6803j) (0.7523 + 0.5035j) 287 (−0.1093 + 0.343j)  (−0.4091 − 0.6803j) (0.7523 + 0.0328j) 288  (0.0953 − 0.6954j)  (0.4403 + 0.4792j) (−0.1607 + 1.0626j)  289  (0.0473 − 0.4604j)  (0.4403 − 0.4792j) (−0.1607 − 0.3591j)  290 (−0.1075 − 0.6946j) (−0.4403 + 0.4792j) (−0.1607 + 1.1878j)  291 (−0.0599 − 0.4574j) (−0.4403 − 0.4792j) (−0.1607 − 0.4301j)  292  (0.1584 − 0.6792j) (0.2846 + 0.572j) (−0.1607 − 1.058j)  293  (0.1198 − 0.4495j) (0.2846 − 0.572j) (−0.1607 − 0.7494j)  294 (−0.1731 − 0.6792j) (−0.2846 + 0.572j)  (−0.1607 − 1.1847j)  295 (−0.1267 − 0.4471j) (−0.2846 − 0.572j)  (−0.1607 − 0.6628j)  296  (0.1038 − 0.7681j)  (0.3971 + 0.5118j) (−0.1607 + 0.7523j)  297  (0.0241 − 0.2945j)  (0.3971 − 0.5118j) (−0.1607 − 0.1607j)  298 (−0.1222 − 0.7711j) (−0.3971 + 0.5118j) (−0.1607 + 0.6629j)  299  (−0.032 − 0.2934j) (−0.3971 − 0.5118j) (−0.1607 − 0.0944j)  300  (0.178 − 0.7553j)  (0.3409 + 0.5481j) (−0.1607 + 0.3594j)  301  (0.085 − 0.2892j)  (0.3409 − 0.5481j) (−0.1607 + 0.1597j)  302 (−0.1922 − 0.7587j) (−0.3409 + 0.5481j) (−0.1607 + 0.4297j)  303 (−0.0966 − 0.29j)  (−0.3409 − 0.5481j) (−0.1607 + 0.0937j)  304  (0.0277 − 0.7029j)  (0.491 + 0.5389j) (−0.1607 + 0.9504j)  305 (0.0289 − 0.426j)  (0.491 − 0.5389j) (−0.1607 − 0.2918j)  306 (−0.038 − 0.702j)  (−0.491 + 0.5389j) (−0.1607 + 1.3347j)  307  (−0.042 − 0.4295j)  (−0.491 − 0.5389j) (−0.1607 − 0.503j)  308  (0.2234 − 0.6626j)  (0.3098 + 0.6428j) (−0.1607 − 0.946j)  309  (0.1215 − 0.4077j)  (0.3098 − 0.6428j) (−0.1607 − 0.8449j)  310 (−0.2387 − 0.6644j) (−0.3098 + 0.6428j) (−0.1607 − 1.331j)  311 (−0.1305 − 0.409j)  (−0.3098 − 0.6428j) (−0.1607 − 0.5804j)  312  (0.0301 − 0.7807j)  (0.4363 + 0.5791j) (−0.1607 + 0.8462j)  313  (0.0303 − 0.3591j)  (0.4363 − 0.5791j) (−0.1607 − 0.2242j)  314 (−0.0465 − 0.7785j) (−0.4363 + 0.5791j) (−0.1607 + 0.5805j)  315 (−0.0456 − 0.3566j) (−0.4363 − 0.5791j) (−0.1607 − 0.0332j)  316  (0.2496 − 0.7328j)  (0.375 + 0.6138j) (−0.1607 + 0.2916j)  317  (0.0994 − 0.3418j)  (0.375 − 0.6138j) (−0.1607 + 0.2239j)  318 (−0.2667 − 0.7328j)  (−0.375 + 0.6138j) (−0.1607 + 0.5035j)  319 (−0.1126 − 0.3464j)  (−0.375 − 0.6138j) (−0.1607 + 0.0328j)  320  (0.6978 + 0.1033j)  (0.6485 + 0.5868j) (0.6629 + 1.0626j) 321  (0.4746 + 0.0555j)  (0.6485 − 0.5868j) (0.6629 − 0.3591j) 322 (−0.7054 + 0.1101j) (−0.6485 + 0.5868j) (0.6629 + 1.1878j) 323 (−0.4839 + 0.0617j) (−0.6485 − 0.5868j) (0.6629 − 0.4301j) 324  (0.684 + 0.1699j)  (0.782 + 0.3674j) (0.6629 − 1.058j)  325  (0.4599 + 0.1257j)  (0.782 − 0.3674j) (0.6629 − 0.7494j) 326 (−0.6846 + 0.1737j)  (−0.782 + 0.3674j) (0.6629 − 1.1847j) 327 (−0.4678 + 0.1235j)  (−0.782 − 0.3674j) (0.6629 − 0.6628j) 328  (0.7735 + 0.1152j)  (0.7016 + 0.5185j) (0.6629 + 0.7523j) 329  (0.3319 + 0.0298j)  (0.7016 − 0.5185j) (0.6629 − 0.1607j) 330 (−0.7747 + 0.1171j) (−0.7016 + 0.5185j) (0.6629 + 0.6629j) 331 (−0.3384 + 0.0336j) (−0.7016 − 0.5185j) (0.6629 − 0.0944j) 332  (0.7572 + 0.1878j) (0.7462 + 0.445j) (0.6629 + 0.3594j) 333  (0.3215 + 0.0853j) (0.7462 − 0.445j) (0.6629 + 0.1597j) 334 (−0.7581 + 0.1947j) (−0.7462 + 0.445j)  (0.6629 + 0.4297j) 335 (−0.3301 + 0.0957j) (−0.7462 − 0.445j)  (0.6629 + 0.0937j) 336  (0.7024 + 0.0345j)  (0.5943 + 0.5387j) (0.6629 + 0.9504j) 337 (0.4548 + 0.033j)  (0.5943 − 0.5387j) (0.6629 − 0.2918j) 338  (−0.711 + 0.0382j) (−0.5943 + 0.5387j) (0.6629 + 1.3347j) 339  (−0.459 + 0.0384j) (−0.5943 − 0.5387j) (0.6629 − 0.503j)  340  (0.661 + 0.2372j)  (0.7127 + 0.3377j) (0.6629 − 0.946j)  341  (0.4304 + 0.1413j)  (0.7127 − 0.3377j) (0.6629 − 0.8449j) 342 (−0.6658 + 0.2416j) (−0.7127 + 0.3377j) (0.6629 − 1.331j)  343 (−0.4375 + 0.139j)  (−0.7127 − 0.3377j) (0.6629 − 0.5804j) 344  (0.7815 + 0.0351j)  (0.6416 + 0.4762j) (0.6629 + 0.8462j) 345  (0.3845 + 0.0331j)  (0.6416 − 0.4762j) (0.6629 − 0.2242j) 346 (−0.784 + 0.037j) (−0.6416 + 0.4762j) (0.6629 + 0.5805j) 347 (−0.3946 + 0.0376j) (−0.6416 − 0.4762j) (0.6629 − 0.0332j) 348  (0.7308 + 0.2641j)  (0.6805 + 0.4088j) (0.6629 + 0.2916j) 349  (0.3662 + 0.1117j)  (0.6805 − 0.4088j) (0.6629 + 0.2239j) 350 (−0.7321 + 0.2669j) (−0.6805 + 0.4088j) (0.6629 + 0.5035j) 351 (−0.3756 + 0.1152j) (−0.6805 − 0.4088j) (0.6629 + 0.0328j) 352  (0.6946 − 0.1047j)  (0.4788 + 0.4401j) (−0.0944 + 1.0626j)  353  (0.472 − 0.0599j)  (0.4788 − 0.4401j) (−0.0944 − 0.3591j)  354  (−0.707 − 0.1019j) (−0.4788 + 0.4401j) (−0.0944 + 1.1878j)  355  (−0.481 − 0.0578j) (−0.4788 − 0.4401j) (−0.0944 − 0.4301j)  356  (0.6803 − 0.1731j)  (0.5723 + 0.2842j) (−0.0944 − 1.058j)  357  (0.4592 − 0.1234j)  (0.5723 − 0.2842j) (−0.0944 − 0.7494j)  358 (−0.6945 − 0.1702j) (−0.5723 + 0.2842j) (−0.0944 − 1.1847j)  359 (−0.4666 − 0.1204j) (−0.5723 − 0.2842j) (−0.0944 − 0.6628j)  360  (0.7686 − 0.1174j)  (0.5126 + 0.3966j) (−0.0944 + 0.7523j)  361  (0.3344 − 0.0345j)  (0.5126 − 0.3966j) (−0.0944 − 0.1607j)  362 (−0.7795 − 0.1132j) (−0.5126 + 0.3966j) (−0.0944 + 0.6629j)  363 (−0.3338 − 0.0267j) (−0.5126 − 0.3966j) (−0.0944 − 0.0944j)  364 (0.7525 − 0.192j)  (0.5486 + 0.3406j) (−0.0944 + 0.3594j)  365  (0.3214 − 0.0877j)  (0.5486 − 0.3406j) (−0.0944 + 0.1597j)  366 (−0.7618 − 0.1884j) (−0.5486 + 0.3406j) (−0.0944 + 0.4297j)  367  (−0.327 − 0.0901j) (−0.5486 − 0.3406j) (−0.0944 + 0.0937j)  368  (0.7037 − 0.0376j) (0.5388 + 0.491j) (−0.0944 + 0.9504j)  369  (0.4509 − 0.0353j) (0.5388 − 0.491j) (−0.0944 − 0.2918j)  370 (−0.7125 − 0.0349j) (−0.5388 + 0.491j)  (−0.0944 + 1.3347j)  371 (−0.4601 − 0.0338j) (−0.5388 − 0.491j)  (−0.0944 − 0.503j)  372  (0.658 − 0.2415j)  (0.6432 + 0.3095j) (−0.0944 − 0.946j)  373 (0.4253 − 0.138j)  (0.6432 − 0.3095j) (−0.0944 − 0.8449j)  374 (−0.6673 − 0.2334j) (−0.6432 + 0.3095j) (−0.0944 − 1.331j)  375 (−0.4353 − 0.142j)  (−0.6432 − 0.3095j) (−0.0944 − 0.5804j)  376  (0.7776 − 0.0416j)  (0.5792 + 0.4361j) (−0.0944 + 0.8462j)  377  (0.3828 − 0.0336j)  (0.5792 − 0.4361j) (−0.0944 − 0.2242j)  378 (−0.7872 − 0.0398j) (−0.5792 + 0.4361j) (−0.0944 + 0.5805j)  379  (−0.391 − 0.0341j) (−0.5792 − 0.4361j) (−0.0944 − 0.0332j)  380  (0.7242 − 0.2666j)  (0.6142 + 0.3748j) (−0.0944 + 0.2916j)  381 (0.3657 − 0.108j)  (0.6142 − 0.3748j) (−0.0944 + 0.2239j)  382 (−0.7381 − 0.2626j) (−0.6142 + 0.3748j) (−0.0944 + 0.5035j)  383 (−0.3728 − 0.111j)  (−0.6142 − 0.3748j) (−0.0944 + 0.0328j)  384  (0.4153 + 0.5601j)  (0.6369 + 0.7034j) (0.3594 + 1.0626j) 385  (0.2833 + 0.3791j)  (0.6369 − 0.7034j) (0.3594 − 0.3591j) 386 (−0.4077 + 0.5667j) (−0.6369 + 0.7034j) (0.3594 + 1.1878j) 387 (−0.2787 + 0.3761j) (−0.6369 − 0.7034j) (0.3594 − 0.4301j) 388  (0.3594 + 0.6034j)  (0.3992 + 0.8521j) (0.3594 − 1.058j)  389  (0.2226 + 0.4131j)  (0.3992 − 0.8521j) (0.3594 − 0.7494j) 390 (−0.3546 + 0.6133j) (−0.3992 + 0.8521j) (0.3594 − 1.1847j) 391 (−0.2211 + 0.412j)  (−0.3992 − 0.8521j) (0.3594 − 0.6628j) 392  (0.4609 + 0.6268j)  (0.5628 + 0.7625j) (0.3594 + 0.7523j) 393  (0.2077 + 0.2388j)  (0.5628 − 0.7625j) (0.3594 − 0.1607j) 394 (−0.4572 + 0.6304j) (−0.5628 + 0.7625j) (0.3594 + 0.6629j) 395 (−0.2071 + 0.2395j) (−0.5628 − 0.7625j) (0.3594 − 0.0944j) 396  (0.398 + 0.6663j)  (0.483 + 0.8118j) (0.3594 + 0.3594j) 397  (0.1564 + 0.2707j)  (0.483 − 0.8118j) (0.3594 + 0.1597j) 398 (−0.3919 + 0.6739j)  (−0.483 + 0.8118j) (0.3594 + 0.4297j) 399 (−0.1588 + 0.2723j)  (−0.483 − 0.8118j) (0.3594 + 0.0937j) 400  (0.4691 + 0.5203j)  (0.6889 + 0.7607j) (0.3594 + 0.9504j) 401  (0.2908 + 0.3407j)  (0.6889 − 0.7607j) (0.3594 − 0.2918j) 402 (−0.4657 + 0.5244j) (−0.6889 + 0.7607j) (0.3594 + 1.3347j) 403  (−0.288 + 0.3402j) (−0.6889 − 0.7607j) (0.3594 − 0.503j)  404 (0.2992 + 0.636j)  (0.4324 + 0.9241j) (0.3594 − 0.946j)  405  (0.195 + 0.3956j)  (0.4324 − 0.9241j) (0.3594 − 0.8449j) 406  (−0.292 + 0.6388j) (−0.4324 + 0.9241j) (0.3594 − 1.331j)  407 (−0.1945 + 0.3903j) (−0.4324 − 0.9241j) (0.3594 − 0.5804j) 408  (0.5189 + 0.5794j)  (0.6091 + 0.8245j) (0.3594 + 0.8462j) 409  (0.2445 + 0.2905j)  (0.6091 − 0.8245j) (0.3594 − 0.2242j) 410 (−0.5158 + 0.5817j) (−0.6091 + 0.8245j) (0.3594 + 0.5805j) 411 (−0.2461 + 0.2872j) (−0.6091 − 0.8245j) (0.3594 − 0.0332j) 412  (0.3348 + 0.7019j)  (0.5228 + 0.8795j) (0.3594 + 0.2916j) 413  (0.1782 + 0.3285j)  (0.5228 − 0.8795j) (0.3594 + 0.2239j) 414  (−0.327 + 0.7086j) (−0.5228 + 0.8795j) (0.3594 + 0.5035j) 415 (−0.1797 + 0.3239j) (−0.5228 − 0.8795j) (0.3594 + 0.0328j) 416  (0.4044 − 0.5663j)  (1.0985 + 1.2137j) (0.1597 + 1.0626j) 417  (0.2784 − 0.3723j)  (1.0985 − 1.2137j) (0.1597 − 0.3591j) 418  (−0.414 − 0.5661j) (−1.0985 + 1.2137j) (0.1597 + 1.1878j) 419 (−0.2855 − 0.3768j) (−1.0985 − 1.2137j) (0.1597 − 0.4301j) 420  (0.3464 − 0.6042j)  (0.6952 + 1.4795j) (0.1597 − 1.058j)  421  (0.218 − 0.4068j)  (0.6952 − 1.4795j) (0.1597 − 0.7494j) 422 (−0.3588 − 0.6031j) (−0.6952 + 1.4795j) (0.1597 − 1.1847j) 423  (−0.228 − 0.4086j) (−0.6952 − 1.4795j) (0.1597 − 0.6628j) 424  (0.4496 − 0.6241j) (0.9727 + 1.316j) (0.1597 + 0.7523j) 425  (0.1973 − 0.2358j) (0.9727 − 1.316j) (0.1597 − 0.1607j) 426 (−0.4618 − 0.6251j) (−0.9727 + 1.316j)  (0.1597 + 0.6629j) 427 (−0.2074 − 0.2334j) (−0.9727 − 1.316j)  (0.1597 − 0.0944j) 428  (0.3837 − 0.6687j)  (0.8374 + 1.4043j) (0.1597 + 0.3594j) 429    (0.15 − 0.2654j)  (0.8374 − 1.4043j) (0.1597 + 0.1597j) 430 (−0.3983 − 0.6688j) (−0.8374 + 1.4043j) (0.1597 + 0.4297j) 431 (−0.1577 − 0.2634j) (−0.8374 − 1.4043j) (0.1597 + 0.0937j) 432 (0.4584 − 0.523j)  (1.0103 + 1.1159j) (0.1597 + 0.9504j) 433  (0.286 − 0.3374j)  (1.0103 − 1.1159j) (0.1597 − 0.2918j) 434 (−0.4707 − 0.5192j) (−1.0103 + 1.1159j) (0.1597 + 1.3347j) 435  (−0.291 − 0.3391j) (−1.0103 − 1.1159j) (0.1597 − 0.503j)  436  (0.2872 − 0.6367j)  (0.6395 + 1.3601j) (0.1597 − 0.946j)  437  (0.1885 − 0.3827j)  (0.6395 − 1.3601j) (0.1597 − 0.8449j) 438 (−0.2972 − 0.6351j) (−0.6395 + 1.3601j) (0.1597 − 1.331j)  439 (−0.1996 − 0.3857j) (−0.6395 − 1.3601j) (0.1597 − 0.5804j) 440  (0.5098 − 0.5831j)  (0.8958 + 1.2097j) (0.1597 + 0.8462j) 441  (0.2378 − 0.2832j)  (0.8958 − 1.2097j) (0.1597 − 0.2242j) 442 (−0.5185 − 0.5724j) (−0.8958 + 1.2097j) (0.1597 + 0.5805j) 443  (−0.245 − 0.2864j) (−0.8958 − 1.2097j) (0.1597 − 0.0332j) 444  (0.3213 − 0.7036j)  (0.7706 + 1.2911j) (0.1597 + 0.2916j) 445  (0.1694 − 0.3292j)  (0.7706 − 1.2911j) (0.1597 + 0.2239j) 446  (−0.333 − 0.7005j) (−0.7706 + 1.2911j) (0.1597 + 0.5035j) 447 (−0.1813 − 0.3203j) (−0.7706 − 1.2911j) (0.1597 + 0.0328j) 448  (0.5565 + 0.4175j)  (0.7036 + 0.6365j) (0.4297 + 1.0626j) 449  (0.3788 + 0.2851j)  (0.7036 − 0.6365j) (0.4297 − 0.3591j) 450  (−0.559 + 0.4229j) (−0.7036 + 0.6365j) (0.4297 + 1.1878j) 451 (−0.3788 + 0.2891j) (−0.7036 − 0.6365j) (0.4297 − 0.4301j) 452  (0.5995 + 0.3619j)  (0.8522 + 0.3989j) (0.4297 − 1.058j)  453    (0.41 + 0.2381j)  (0.8522 − 0.3989j) (0.4297 − 0.7494j) 454 (−0.6012 + 0.3679j) (−0.8522 + 0.3989j) (0.4297 − 1.1847j) 455 (−0.4115 + 0.237j)  (−0.8522 − 0.3989j) (0.4297 − 0.6628j) 456  (0.6205 + 0.4659j)  (0.7622 + 0.5621j) (0.4297 + 0.7523j) 457  (0.2561 + 0.1988j)  (0.7622 − 0.5621j) (0.4297 − 0.1607j) 458 (−0.6201 + 0.4704j) (−0.7622 + 0.5621j) (0.4297 + 0.6629j) 459 (−0.2602 + 0.2035j) (−0.7622 − 0.5621j) (0.4297 − 0.0944j) 460 (0.666 + 0.4j)   (0.8121 + 0.4829j) (0.4297 + 0.3594j) 461 (0.2927 + 0.155j)  (0.8121 − 0.4829j) (0.4297 + 0.1597j) 462 (−0.6627 + 0.4065j) (−0.8121 + 0.4829j) (0.4297 + 0.4297j) 463 (−0.2942 + 0.1577j) (−0.8121 − 0.4829j) (0.4297 + 0.0937j) 464    (0.52 + 0.4703j)  (0.761 + 0.6881j) (0.4297 + 0.9504j) 465  (0.3402 + 0.2969j)  (0.761 − 0.6881j) (0.4297 − 0.2918j) 466 (−0.5136 + 0.4742j)  (−0.761 + 0.6881j) (0.4297 + 1.3347j) 467 (−0.3425 + 0.3006j)  (−0.761 − 0.6881j) (0.4297 − 0.503j)  468  (0.6335 + 0.2992j)  (0.9243 + 0.4319j) (0.4297 − 0.946j)  469  (0.404 + 0.2052j)  (0.9243 − 0.4319j) (0.4297 − 0.8449j) 470  (−0.636 + 0.3079j) (−0.9243 + 0.4319j) (0.4297 − 1.331j)  471  (−0.407 + 0.2004j) (−0.9243 − 0.4319j) (0.4297 − 0.5804j) 472  (0.5761 + 0.5217j)  (0.8247 + 0.6086j) (0.4297 + 0.8462j) 473  (0.2943 + 0.2471j)  (0.8247 − 0.6086j) (0.4297 − 0.2242j) 474 (−0.5723 + 0.5251j) (−0.8247 + 0.6086j) (0.4297 + 0.5805j) 475 (−0.2985 + 0.2461j) (−0.8247 − 0.6086j) (0.4297 − 0.0332j) 476 (0.7045 + 0.336j)  (0.8793 + 0.5228j) (0.4297 + 0.2916j) 477 (0.3384 + 0.174j)  (0.8793 − 0.5228j) (0.4297 + 0.2239j) 478 (−0.7003 + 0.3413j) (−0.8793 + 0.5228j) (0.4297 + 0.5035j) 479 (−0.3426 + 0.1793j) (−0.8793 − 0.5228j) (0.4297 + 0.0328j) 480  (0.5483 − 0.4219j)  (1.2125 + 1.0979j) (0.0937 + 1.0626j) 481  (0.3728 − 0.2866j)  (1.2125 − 1.0979j) (0.0937 − 0.3591j) 482 (−0.5634 − 0.4175j) (−1.2125 + 1.0979j) (0.0937 + 1.1878j) 483 (−0.3815 − 0.2874j) (−1.2125 − 1.0979j) (0.0937 − 0.4301j) 484  (0.5909 − 0.3657j)  (1.4792 + 0.6961j) (0.0937 − 1.058j)  485  (0.4019 − 0.2375j)  (1.4792 − 0.6961j) (0.0937 − 0.7494j) 486 (−0.6034 − 0.3608j) (−1.4792 + 0.6961j) (0.0937 − 1.1847j) 487 (−0.4194 − 0.233j)  (−1.4792 − 0.6961j) (0.0937 − 0.6628j) 488  (0.6129 − 0.4726j) (1.3155 + 0.973j) (0.0937 + 0.7523j) 489  (0.2535 − 0.1974j) (1.3155 − 0.973j) (0.0937 − 0.1607j) 490 (−0.6218 − 0.4643j) (−1.3155 + 0.973j)  (0.0937 + 0.6629j) 491 (−0.2603 − 0.1987j) (−1.3155 − 0.973j)  (0.0937 − 0.0944j) 492  (0.6588 − 0.4093j)  (1.4038 + 0.8377j) (0.0937 + 0.3594j) 493  (0.2842 − 0.1506j)  (1.4038 − 0.8377j) (0.0937 + 0.1597j) 494 (−0.6665 − 0.4036j) (−1.4038 + 0.8377j) (0.0937 + 0.4297j) 495 (−0.2976 − 0.1518j) (−1.4038 − 0.8377j) (0.0937 + 0.0937j) 496    (0.51 − 0.4746j)  (1.1144 + 1.0103j) (0.0937 + 0.9504j) 497  (0.3347 − 0.2965j)  (1.1144 − 1.0103j) (0.0937 − 0.2918j) 498 (−0.5148 − 0.4713j) (−1.1144 + 1.0103j) (0.0937 + 1.3347j) 499 (−0.3461 − 0.2979j) (−1.1144 − 1.0103j) (0.0937 − 0.503j)  500  (0.6272 − 0.3068j)  (1.3602 + 0.6395j) (0.0937 − 0.946j)  501  (0.4006 − 0.2039j)  (1.3602 − 0.6395j) (0.0937 − 0.8449j) 502  (−0.64 − 0.3011j) (−1.3602 + 0.6395j) (0.0937 − 1.331j)  503 (−0.4088 − 0.1967j) (−1.3602 − 0.6395j) (0.0937 − 0.5804j) 504  (0.5658 − 0.5287j)  (1.209 + 0.8956j) (0.0937 + 0.8462j) 505 (0.2884 − 0.238j)  (1.209 − 0.8956j) (0.0937 − 0.2242j) 506 (−0.5678 − 0.5205j)  (−1.209 + 0.8956j) (0.0937 + 0.5805j) 507 (−0.2983 − 0.2402j)  (−1.209 − 0.8956j) (0.0937 − 0.0332j) 508  (0.6931 − 0.3397j)  (1.2908 + 0.7709j) (0.0937 + 0.2916j) 509  (0.3332 − 0.1749j)  (1.2908 − 0.7709j) (0.0937 + 0.2239j) 510 (−0.7075 − 0.3341j) (−1.2908 + 0.7709j) (0.0937 + 0.5035j) 511 (−0.3454 − 0.176j)  (−1.2908 − 0.7709j) (0.0937 + 0.0328j) 512  (0.1786 + 1.1724j)  (0.027 + 0.0611j) (0.9504 + 1.0626j) 513  (0.1917 + 1.2732j)  (0.027 − 0.0611j) (0.9504 − 0.3591j) 514 (−0.1693 + 1.1787j)  (−0.027 + 0.0611j) (0.9504 + 1.1878j) 515 (−0.1855 + 1.2741j)  (−0.027 − 0.0611j) (0.9504 − 0.4301j) 516  (0.2907 + 1.1433j) (0.0317 + 0.262j) (0.9504 − 1.058j)  517  (0.309 + 1.2499j) (0.0317 − 0.262j) (0.9504 − 0.7494j) 518 (−0.2863 + 1.1591j) (−0.0317 + 0.262j)  (0.9504 − 1.1847j) 519 (−0.3086 + 1.25j)  (−0.0317 − 0.262j)  (0.9504 − 0.6628j) 520  (0.1416 + 0.9264j)  (0.043 + 0.1103j) (0.9504 + 0.7523j) 521  (0.258 + 1.6315j)  (0.043 − 0.1103j) (0.9504 − 0.1607j) 522 (−0.1358 + 0.9275j)  (−0.043 + 0.1103j) (0.9504 + 0.6629j) 523 (−0.2411 + 1.6341j)  (−0.043 − 0.1103j) (0.9504 − 0.0944j) 524 (0.2287 + 0.902j)  (0.025 + 0.1818j) (0.9504 + 0.3594j) 525  (0.3934 + 1.4627j)  (0.025 − 0.1818j) (0.9504 + 0.1597j) 526 (−0.2253 + 0.9122j)  (−0.025 + 0.1818j) (0.9504 + 0.4297j) 527 (−0.3962 + 1.6036j)  (−0.025 − 0.1818j) (0.9504 + 0.0937j) 528  (0.0567 + 1.1856j)  (0.0278 + 0.3759j) (0.9504 + 0.9504j) 529  (0.0657 + 1.2858j)  (0.0278 − 0.3759j) (0.9504 − 0.2918j) 530 (−0.0561 + 1.1863j) (−0.0278 + 0.3759j) (0.9504 + 1.3347j) 531 (−0.0624 + 1.286j)  (−0.0278 − 0.3759j) (0.9504 − 0.503j)  532  (0.4094 + 1.1197j)  (0.0553 + 0.3141j) (0.9504 − 0.946j)  533  (0.4903 + 1.3021j)  (0.0553 − 0.3141j) (0.9504 − 0.8449j) 534 (−0.3997 + 1.1155j) (−0.0553 + 0.3141j) (0.9504 − 1.331j)  535 (−0.4291 + 1.2139j) (−0.0553 − 0.3141j) (0.9504 − 0.5804j) 536  (0.048 + 0.9321j)  (0.0722 + 0.3941j) (0.9504 + 0.8462j) 537  (0.0854 + 1.6496j)  (0.0722 − 0.3941j) (0.9504 − 0.2242j) 538 (−0.0436 + 0.9357j) (−0.0722 + 0.3941j) (0.9504 + 0.5805j) 539 (−0.077 + 1.65j)  (−0.0722 − 0.3941j) (0.9504 − 0.0332j) 540  (0.3228 + 0.8843j)  (0.1151 + 0.3654j) (0.9504 + 0.2916j) 541  (0.531 + 1.4186j)  (0.1151 − 0.3654j) (0.9504 + 0.2239j) 542 (−0.3122 + 0.8829j) (−0.1151 + 0.3654j) (0.9504 + 0.5035j) 543 (−0.5528 + 1.5565j) (−0.1151 − 0.3654j) (0.9504 + 0.0328j) 544 (0.1657 − 1.171j)  (0.0317 + 0.5381j) (−0.2918 + 1.0626j)  545 (0.1862 − 1.274j)  (0.0317 − 0.5381j) (−0.2918 − 0.3591j)  546 (−0.1783 − 1.1678j) (−0.0317 + 0.5381j) (−0.2918 + 1.1878j)  547 (−0.1975 − 1.2723j) (−0.0317 − 0.5381j) (−0.2918 − 0.4301j)  548  (0.2774 − 1.1499j)  (0.2051 + 0.5107j) (−0.2918 − 1.058j)  549  (0.2994 − 1.2522j)  (0.2051 − 0.5107j) (−0.2918 − 0.7494j)  550 (−0.2937 − 1.1526j) (−0.2051 + 0.5107j) (−0.2918 − 1.1847j)  551 (−0.3184 − 1.2475j) (−0.2051 − 0.5107j) (−0.2918 − 0.6628j)  552  (0.1268 − 0.9247j)  (0.0921 + 0.5307j) (−0.2918 + 0.7523j)  553  (0.2411 − 1.6341j)  (0.0921 − 0.5307j) (−0.2918 − 0.1607j)  554  (−0.146 − 0.9209j) (−0.0921 + 0.5307j) (−0.2918 + 0.6629j)  555 (−0.2471 − 1.6332j) (−0.0921 − 0.5307j) (−0.2918 − 0.0944j)  556  (0.2174 − 0.9034j) (0.1506 + 0.526j) (−0.2918 + 0.3594j)  557  (0.4076 − 1.6007j) (0.1506 − 0.526j) (−0.2918 + 0.1597j)  558 (−0.2309 − 0.9025j) (−0.1506 + 0.526j)  (−0.2918 + 0.4297j)  559 (−0.4053 − 1.6013j) (−0.1506 − 0.526j)  (−0.2918 + 0.0937j)  560  (0.0491 − 1.1786j)  (0.0272 + 0.4642j) (−0.2918 + 0.9504j)  561  (0.0566 − 1.2863j)  (0.0272 − 0.4642j) (−0.2918 − 0.2918j)  562 (−0.0675 − 1.1846j) (−0.0272 + 0.4642j) (−0.2918 + 1.3347j)  563 (−0.0679 − 1.2857j) (−0.0272 − 0.4642j) (−0.2918 − 0.503j)  564  (0.3898 − 1.1113j)  (0.1897 + 0.4469j) (−0.2918 − 0.946j)  565  (0.4225 − 1.2162j)  (0.1897 − 0.4469j) (−0.2918 − 0.8449j)  566  (−0.409 − 1.1185j) (−0.1897 + 0.4469j) (−0.2918 − 1.331j)  567  (−0.439 − 1.2104j) (−0.1897 − 0.4469j) (−0.2918 − 0.5804j)  568  (0.035 − 0.9278j)  (0.0838 + 0.4552j) (−0.2918 + 0.8462j)  569  (0.0826 − 1.6497j)  (0.0838 − 0.4552j) (−0.2918 − 0.2242j)  570 (−0.0547 − 0.9275j) (−0.0838 + 0.4552j) (−0.2918 + 0.5805j)  571 (−0.0884 − 1.6494j) (−0.0838 − 0.4552j) (−0.2918 − 0.0332j)  572    (0.3 − 0.881j)  (0.1492 + 0.4302j) (−0.2918 + 0.2916j)  573 (0.5598 − 1.554j)  (0.1492 − 0.4302j) (−0.2918 + 0.2239j)  574 (−0.3188 − 0.8774j) (−0.1492 + 0.4302j) (−0.2918 + 0.5035j)  575 (−0.5712 − 1.5499j) (−0.1492 − 0.4302j) (−0.2918 + 0.0328j)  576  (1.1647 + 0.1694j)  (0.0534 + 0.0265j) (1.3347 + 1.0626j) 577  (1.4993 + 0.2153j)  (0.0534 − 0.0265j) (1.3347 − 0.3591j) 578 (−1.1674 + 0.1824j) (−0.0534 + 0.0265j) (1.3347 + 1.1878j) 579 (−1.2728 + 0.1939j) (−0.0534 − 0.0265j) (1.3347 − 0.4301j) 580  (1.1424 + 0.2787j)  (0.2607 + 0.0314j) (1.3347 − 1.058j)  581  (1.4721 + 0.3567j)  (0.2607 − 0.0314j) (1.3347 − 0.7494j) 582 (−1.1453 + 0.2988j) (−0.2607 + 0.0314j) (1.3347 − 1.1847j) 583 (−1.2465 + 0.3223j) (−0.2607 − 0.0314j) (1.3347 − 0.6628j) 584  (0.9202 + 0.1383j)  (0.1082 + 0.0417j) (1.3347 + 0.7523j) 585  (1.6358 + 0.2295j)  (0.1082 − 0.0417j) (1.3347 − 0.1607j) 586 (−0.9246 + 0.1443j) (−0.1082 + 0.0417j) (1.3347 + 0.6629j) 587 (−1.6335 + 0.2451j) (−0.1082 − 0.0417j) (1.3347 − 0.0944j) 588  (0.9042 + 0.2274j)  (0.1795 + 0.0247j) (1.3347 + 0.3594j) 589  (1.6071 + 0.3817j)  (0.1795 − 0.0247j) (1.3347 + 0.1597j) 590 (−0.9054 + 0.2344j) (−0.1795 + 0.0247j) (1.3347 + 0.4297j) 591 (−1.6014 + 0.4048j) (−0.1795 − 0.0247j) (1.3347 + 0.0937j) 592  (1.1743 + 0.0533j)  (0.3752 + 0.0277j) (1.3347 + 0.9504j) 593  (1.5134 + 0.0631j)  (0.3752 − 0.0277j) (1.3347 − 0.2918j) 594 (−1.1776 + 0.0638j) (−0.3752 + 0.0277j) (1.3347 + 1.3347j) 595 (−1.2856 + 0.0698j) (−0.3752 − 0.0277j) (1.3347 − 0.503j)  596  (1.1172 + 0.3913j)  (0.3134 + 0.0556j) (1.3347 − 0.946j)  597  (1.4323 + 0.4929j)  (0.3134 − 0.0556j) (1.3347 − 0.8449j) 598 (−1.1139 + 0.4116j) (−0.3134 + 0.0556j) (1.3347 − 1.331j)  599  (−1.209 + 0.4427j) (−0.3134 − 0.0556j) (1.3347 − 0.5804j) 600  (0.9317 + 0.0452j)  (0.3933 + 0.0716j) (1.3347 + 0.8462j) 601  (1.6504 + 0.0689j)  (0.3933 − 0.0716j) (1.3347 − 0.2242j) 602 (−0.9339 + 0.0509j) (−0.3933 + 0.0716j) (1.3347 + 0.5805j) 603 (−1.6494 + 0.0884j) (−0.3933 − 0.0716j) (1.3347 − 0.0332j) 604  (0.8748 + 0.3161j)  (0.365 + 0.1149j) (1.3347 + 0.2916j) 605  (1.5636 + 0.5325j)  (0.365 − 0.1149j) (1.3347 + 0.2239j) 606 (−0.8734 + 0.322j)   (−0.365 + 0.1149j) (1.3347 + 0.5035j) 607 (−1.5514 + 0.5672j)  (−0.365 − 0.1149j) (1.3347 + 0.0328j) 608  (1.1645 − 0.1744j)  (0.538 + 0.0316j) (−0.503 + 1.0626j) 609  (1.498 − 0.2244j)  (0.538 − 0.0316j) (−0.503 − 0.3591j) 610 (−1.1728 − 0.1765j)  (−0.538 + 0.0316j) (−0.503 + 1.1878j) 611 (−1.2737 − 0.1879j)  (−0.538 − 0.0316j) (−0.503 − 0.4301j) 612  (1.1384 − 0.2837j)  (0.5107 + 0.2047j) (−0.503 − 1.058j)  613  (1.4708 − 0.3623j)  (0.5107 − 0.2047j) (−0.503 − 0.7494j) 614 (−1.1494 − 0.2879j) (−0.5107 + 0.2047j) (−0.503 − 1.1847j) 615 (−1.2492 − 0.3118j) (−0.5107 − 0.2047j) (−0.503 − 0.6628j) 616  (0.9147 − 0.1392j)  (0.5312 + 0.0918j) (−0.503 + 0.7523j) 617  (1.634 − 0.2415j)  (0.5312 − 0.0918j) (−0.503 − 0.1607j) 618 (−0.9308 − 0.1394j) (−0.5312 + 0.0918j) (−0.503 + 0.6629j) 619 (−1.6357 − 0.2298j) (−0.5312 − 0.0918j) (−0.503 − 0.0944j) 620  (0.8961 − 0.2302j)  (0.5264 + 0.1505j) (−0.503 + 0.3594j) 621  (1.6044 − 0.3927j)  (0.5264 − 0.1505j) (−0.503 + 0.1597j) 622 (−0.9094 − 0.2263j) (−0.5264 + 0.1505j) (−0.503 + 0.4297j) 623 (−1.6046 − 0.3921j) (−0.5264 − 0.1505j) (−0.503 + 0.0937j) 624  (1.1802 − 0.0531j)  (0.464 + 0.0275j) (−0.503 + 0.9504j) 625  (1.5126 − 0.0797j)  (0.464 − 0.0275j) (−0.503 − 0.2918j) 626 (−1.1809 − 0.0568j)  (−0.464 + 0.0275j) (−0.503 + 1.3347j) 627 (−1.2861 − 0.0597j)  (−0.464 − 0.0275j) (−0.503 − 0.503j)  628  (1.1032 − 0.3996j)  (0.4471 + 0.1888j) (−0.503 − 0.946j)  629  (1.4282 − 0.5046j)  (0.4471 − 0.1888j) (−0.503 − 0.8449j) 630 (−1.1225 − 0.4008j) (−0.4471 + 0.1888j) (−0.503 − 1.331j)  631 (−1.2128 − 0.4322j) (−0.4471 − 0.1888j) (−0.503 − 0.5804j) 632  (0.928 − 0.0459j)  (0.4551 + 0.0837j) (−0.503 + 0.8462j) 633  (1.6495 − 0.0876j)  (0.4551 − 0.0837j) (−0.503 − 0.2242j) 634 (−0.9373 − 0.0446j) (−0.4551 + 0.0837j) (−0.503 + 0.5805j) 635 (−1.6498 − 0.0804j) (−0.4551 − 0.0837j) (−0.503 − 0.0332j) 636  (0.8685 − 0.3189j)  (0.4306 + 0.1487j) (−0.503 + 0.2916j) 637  (1.5587 − 0.5466j)  (0.4306 − 0.1487j) (−0.503 + 0.2239j) 638 (−0.8786 − 0.3163j) (−0.4306 + 0.1487j) (−0.503 + 0.5035j) 639 (−1.5586 − 0.547j)  (−0.4306 − 0.1487j) (−0.503 + 0.0328j) 640  (0.7069 + 0.9425j)  (0.0575 + 1.1837j) (−0.946 + 1.0626j) 641 (0.8322 + 1.115j)  (0.0575 − 1.1837j) (−0.946 − 0.3591j) 642 (−0.698 + 0.952j) (−0.0575 + 1.1837j) (−0.946 + 1.1878j) 643 (−0.7634 + 1.0368j) (−0.0575 − 1.1837j) (−0.946 − 0.4301j) 644  (0.615 + 1.0184j) (0.3973 + 1.121j) (−0.946 − 1.058j)  645  (0.7224 + 1.1891j) (0.3973 − 1.121j) (−0.946 − 0.7494j) 646 (−0.6048 + 1.0285j) (−0.3973 + 1.121j)  (−0.946 − 1.1847j) 647  (−0.653 + 1.1096j) (−0.3973 − 1.121j)  (−0.946 − 0.6628j) 648  (0.5515 + 0.7486j)  (0.172 + 1.1733j) (−0.946 + 0.7523j) 649 (0.9152 + 1.207j)  (0.172 − 1.1733j) (−0.946 − 0.1607j) 650 (−0.5507 + 0.7546j)  (−0.172 + 1.1733j) (−0.946 + 0.6629j) 651 (−0.9814 + 1.3286j)  (−0.172 − 1.1733j) (−0.946 − 0.0944j) 652  (0.4755 + 0.8063j)  (0.2858 + 1.1531j) (−0.946 + 0.3594j) 653  (0.7878 + 1.2937j)  (0.2858 − 1.1531j) (−0.946 + 0.1597j) 654 (−0.4733 + 0.805j)  (−0.2858 + 1.1531j) (−0.946 + 0.4297j) 655 (−0.8424 + 1.4208j) (−0.2858 − 1.1531j) (−0.946 + 0.0937j) 656  (0.7981 + 0.8749j)  (0.0532 + 1.0946j) (−0.946 + 0.9504j) 657  (0.9342 + 1.0311j)  (0.0532 − 1.0946j) (−0.946 − 0.2918j) 658 (−0.7956 + 0.8855j) (−0.0532 + 1.0946j) (−0.946 + 1.3347j) 659 (−0.8619 + 0.9565j) (−0.0532 − 1.0946j) (−0.946 − 0.503j)  660  (0.5126 + 1.0729j)  (0.367 + 1.0381j) (−0.946 − 0.946j)  661  (0.6094 + 1.2508j)  (0.367 − 1.0381j) (−0.946 − 0.8449j) 662 (−0.5018 + 1.0771j)  (−0.367 + 1.0381j) (−0.946 − 1.331j)  663 (−0.5458 + 1.1661j)  (−0.367 − 1.0381j) (−0.946 − 0.5804j) 664  (0.6234 + 0.6912j)  (0.159 + 1.0852j) (−0.946 + 0.8462j) 665  (1.0257 + 1.1146j)  (0.159 − 1.0852j) (−0.946 − 0.2242j) 666 (−0.6154 + 0.6921j)  (−0.159 + 1.0852j) (−0.946 + 0.5805j) 667 (−1.1063 + 1.2266j)  (−0.159 − 1.0852j) (−0.946 − 0.0332j) 668  (0.3995 + 0.8429j)  (0.264 + 1.067j) (−0.946 + 0.2916j) 669  (0.6712 + 1.3579j)  (0.264 − 1.067j) (−0.946 + 0.2239j) 670 (−0.3961 + 0.8456j) (−0.264 + 1.067j) (−0.946 + 0.5035j) 671 (−0.7021 + 1.4952j) (−0.264 − 1.067j) (−0.946 + 0.0328j) 672  (0.7008 − 0.9586j)  (0.0622 + 1.2787j) (−0.8449 + 1.0626j)  673  (0.8267 − 1.1191j)  (0.0622 − 1.2787j) (−0.8449 − 0.3591j)  674 (−0.7111 − 0.9504j) (−0.0622 + 1.2787j) (−0.8449 + 1.1878j)  675  (−0.767 − 1.0341j) (−0.0622 − 1.2787j) (−0.8449 − 0.4301j)  676  (0.6035 − 1.0258j)  (0.4301 + 1.2101j) (−0.8449 − 1.058j)  677  (0.7162 − 1.1928j)  (0.4301 − 1.2101j) (−0.8449 − 0.7494j)  678 (−0.6122 − 1.0147j) (−0.4301 + 1.2101j) (−0.8449 − 1.1847j)  679 (−0.6685 − 1.1004j) (−0.4301 − 1.2101j) (−0.8449 − 0.6628j)  680  (0.5477 − 0.7505j)  (0.1863 + 1.2674j) (−0.8449 + 0.7523j)  681  (0.9065 − 1.2135j)  (0.1863 − 1.2674j) (−0.8449 − 0.1607j)  682 (−0.5559 − 0.752j)  (−0.1863 + 1.2674j) (−0.8449 + 0.6629j)  683 (−0.9899 − 1.3223j) (−0.1863 − 1.2674j) (−0.8449 − 0.0944j)  684  (0.4665 − 0.7984j)  (0.3092 + 1.2448j) (−0.8449 + 0.3594j)  685  (0.7816 − 1.2975j)  (0.3092 − 1.2448j) (−0.8449 + 0.1597j)  686 (−0.4862 − 0.8005j) (−0.3092 + 1.2448j) (−0.8449 + 0.4297j)  687 (−0.8591 − 1.4108j) (−0.3092 − 1.2448j) (−0.8449 + 0.0937j)  688  (0.7846 − 0.8762j)  (0.0672 + 1.3819j) (−0.8449 + 0.9504j)  689  (0.9281 − 1.0365j)  (0.0672 − 1.3819j) (−0.8449 − 0.2918j)  690 (−0.7992 − 0.8736j) (−0.0672 + 1.3819j) (−0.8449 + 1.3347j)  691 (−0.8668 − 0.952j)  (−0.0672 − 1.3819j) (−0.8449 − 0.503j)  692  (0.4984 − 1.0659j) (0.4648 + 1.307j) (−0.8449 − 0.946j)  693  (0.5355 − 1.1709j) (0.4648 − 1.307j) (−0.8449 − 0.8449j)  694 (−0.513 − 1.071j) (−0.4648 + 1.307j)  (−0.8449 − 1.331j)  695 (−0.5555 − 1.1615j) (−0.4648 − 1.307j)  (−0.8449 − 0.5804j)  696  (0.6114 − 0.6943j)  (0.2016 + 1.3696j) (−0.8449 + 0.8462j)  697  (1.0215 − 1.1184j)  (0.2016 − 1.3696j) (−0.8449 − 0.2242j)  698 (−0.6263 − 0.6837j) (−0.2016 + 1.3696j) (−0.8449 + 0.5805j)  699 (−1.1178 − 1.2161j) (−0.2016 − 1.3696j) (−0.8449 − 0.0332j)  700  (0.3859 − 0.8401j)  (0.3344 + 1.3443j) (−0.8449 + 0.2916j)  701  (0.6538 − 1.3664j)  (0.3344 − 1.3443j) (−0.8449 + 0.2239j)  702 (−0.4012 − 0.8435j) (−0.3344 + 1.3443j) (−0.8449 + 0.5035j)  703 (−0.7165 − 1.4883j) (−0.3344 − 1.3443j) (−0.8449 + 0.0328j)  704 (0.9555 + 0.702j)  (1.1848 + 0.0575j) (−1.331 + 1.0626j) 705  (1.2319 + 0.8814j)  (1.1848 − 0.0575j) (−1.331 − 0.3591j) 706 (−0.9498 + 0.7129j) (−1.1848 + 0.0575j) (−1.331 + 1.1878j) 707  (−1.027 + 0.7766j) (−1.1848 − 0.0575j) (−1.331 − 0.4301j) 708  (1.0187 + 0.6027j)  (1.1213 + 0.3973j) (−1.331 − 1.058j)  709  (1.315 + 0.7518j)  (1.1213 − 0.3973j) (−1.331 − 0.7494j) 710 (−1.0083 + 0.6151j) (−1.1213 + 0.3973j) (−1.331 − 1.1847j) 711 (−1.1015 + 0.6666j) (−1.1213 − 0.3973j) (−1.331 − 0.6628j) 712  (0.7463 + 0.5537j)  (1.1742 + 0.1718j) (−1.331 + 0.7523j) 713  (1.3417 + 0.9634j)  (1.1742 − 0.1718j) (−1.331 − 0.1607j) 714  (−0.745 + 0.5654j) (−1.1742 + 0.1718j) (−1.331 + 0.6629j) 715 (−1.3284 + 0.9818j) (−1.1742 − 0.1718j) (−1.331 − 0.0944j) 716  (0.7927 + 0.4759j)  (1.1536 + 0.2855j) (−1.331 + 0.3594j) 717  (1.4277 + 0.8308j)  (1.1536 − 0.2855j) (−1.331 + 0.1597j) 718 (−0.7941 + 0.4894j) (−1.1536 + 0.2855j) (−1.331 + 0.4297j) 719  (−1.413 + 0.8554j) (−1.1536 − 0.2855j) (−1.331 + 0.0937j) 720  (0.8747 + 0.7861j) (1.0956 + 0.053j) (−1.331 + 0.9504j) 721  (1.1389 + 0.9987j) (1.0956 − 0.053j) (−1.331 − 0.2918j) 722 (−0.8696 + 0.7966j) (−1.0956 + 0.053j)  (−1.331 + 1.3347j) 723 (−0.9505 + 0.8685j) (−1.0956 − 0.053j)  (−1.331 − 0.503j)  724  (1.0692 + 0.5015j)  (1.0383 + 0.3669j) (−1.331 − 0.946j)  725  (1.3757 + 0.6339j)  (1.0383 − 0.3669j) (−1.331 − 0.8449j) 726 (−1.0658 + 0.5137j) (−1.0383 + 0.3669j) (−1.331 − 1.331j)  727  (−1.161 + 0.5566j) (−1.0383 − 0.3669j) (−1.331 − 0.5804j) 728  (0.687 + 0.6205j) (1.0863 + 0.159j) (−1.331 + 0.8462j) 729  (1.2372 + 1.0944j) (1.0863 − 0.159j) (−1.331 − 0.2242j) 730 (−0.6877 + 0.6333j) (−1.0863 + 0.159j)  (−1.331 + 0.5805j) 731 (−1.2251 + 1.1079j) (−1.0863 − 0.159j)  (−1.331 − 0.0332j) 732  (0.8436 + 0.3975j) (1.0675 + 0.264j) (−1.331 + 0.2916j) 733  (1.5011 + 0.6893j) (1.0675 − 0.264j) (−1.331 + 0.2239j) 734 (−0.8394 + 0.4073j) (−1.0675 + 0.264j)  (−1.331 + 0.5035j) 735 (−1.4925 + 0.7078j) (−1.0675 − 0.264j)  (−1.331 + 0.0328j) 736  (0.9443 − 0.7071j) (1.2799 + 0.062j) (−0.5804 + 1.0626j)  737  (1.2202 − 0.8975j) (1.2799 − 0.062j) (−0.5804 − 0.3591j)  738 (−0.9487 − 0.6996j) (−1.2799 + 0.062j)  (−0.5804 + 1.1878j)  739  (−1.038 − 0.7618j) (−1.2799 − 0.062j)  (−0.5804 − 0.4301j)  740  (1.0102 − 0.6086j)  (1.2103 + 0.4297j) (−0.5804 − 1.058j)  741  (1.3042 − 0.7703j)  (1.2103 − 0.4297j) (−0.5804 − 0.7494j)  742 (−1.0086 − 0.6001j) (−1.2103 + 0.4297j) (−0.5804 − 1.1847j)  743 (−1.1065 − 0.6583j) (−1.2103 − 0.4297j) (−0.5804 − 0.6628j)  744  (0.738 − 0.5612j) (1.2684 + 0.186j) (−0.5804 + 0.7523j)  745 (1.3385 − 0.968j) (1.2684 − 0.186j) (−0.5804 − 0.1607j)  746 (−0.7447 − 0.5564j) (−1.2684 + 0.186j)  (−0.5804 + 0.6629j)  747 (−1.3369 − 0.9701j) (−1.2684 − 0.186j)  (−0.5804 − 0.0944j)  748  (0.7897 − 0.4876j)  (1.2451 + 0.3089j) (−0.5804 + 0.3594j)  749  (1.4243 − 0.8365j)  (1.2451 − 0.3089j) (−0.5804 + 0.1597j)  750 (−0.7977 − 0.4802j) (−1.2451 + 0.3089j) (−0.5804 + 0.4297j)  751 (−1.4225 − 0.8396j) (−1.2451 − 0.3089j) (−0.5804 + 0.0937j)  752 (0.8677 − 0.793j)  (1.383 + 0.0678j) (−0.5804 + 0.9504j)  753 (1.1351 − 1.003j)  (1.383 − 0.0678j) (−0.5804 − 0.2918j)  754 (−0.8831 − 0.7952j)  (−1.383 + 0.0678j) (−0.5804 + 1.3347j)  755 (−0.9571 − 0.8612j)  (−1.383 − 0.0678j) (−0.5804 − 0.503j)  756  (1.0586 − 0.5052j) (1.3072 + 0.465j) (−0.5804 − 0.946j)  757  (1.3741 − 0.6374j) (1.3072 − 0.465j) (−0.5804 − 0.8449j)  758 (−1.0708 − 0.5059j) (−1.3072 + 0.465j)  (−0.5804 − 1.331j)  759 (−1.1655 − 0.547j)  (−1.3072 − 0.465j)  (−0.5804 − 0.5804j)  760  (0.6789 − 0.6352j)  (1.3701 + 0.2024j) (−0.5804 + 0.8462j)  761  (1.2379 − 1.0937j)  (1.3701 − 0.2024j) (−0.5804 − 0.2242j)  762 (−0.6897 − 0.6256j) (−1.3701 + 0.2024j) (−0.5804 + 0.5805j)  763 (−1.2375 − 1.0941j) (−1.3701 − 0.2024j) (−0.5804 − 0.0332j)  764  (0.8306 − 0.3999j)  (1.3443 + 0.3352j) (−0.5804 + 0.2916j)  765  (1.4995 − 0.6928j)  (1.3443 − 0.3352j) (−0.5804 + 0.2239j)  766  (−0.844 − 0.4028j) (−1.3443 + 0.3352j) (−0.5804 + 0.5035j)  767 (−1.4993 − 0.6933j) (−1.3443 − 0.3352j) (−0.5804 + 0.0328j)  768 (0.1656 + 1.084j)  (0.1481 + 0.1893j) (0.8462 + 1.0626j) 769  (0.2096 + 1.3754j)  (0.1481 − 0.1893j) (0.8462 − 0.3591j) 770 (−0.1593 + 1.0928j) (−0.1481 + 0.1893j) (0.8462 + 1.1878j) 771 (−0.2008 + 1.3767j) (−0.1481 − 0.1893j) (0.8462 − 0.4301j) 772  (0.2771 + 1.0629j)  (0.0947 + 0.2322j) (0.8462 − 1.058j)  773  (0.3461 + 1.3476j)  (0.0947 − 0.2322j) (0.8462 − 0.7494j) 774  (−0.268 + 1.0658j) (−0.0947 + 0.2322j) (0.8462 − 1.1847j) 775  (−0.335 + 1.3504j) (−0.0947 − 0.2322j) (0.8462 − 0.6628j) 776  (0.1532 + 1.0087j)  (0.0996 + 0.1406j) (0.8462 + 0.7523j) 777  (0.2329 + 1.4967j)  (0.0996 − 0.1406j) (0.8462 − 0.1607j) 778 (−0.1438 + 1.0059j) (−0.0996 + 0.1406j) (0.8462 + 0.6629j) 779  (−0.222 + 1.4984j) (−0.0996 − 0.1406j) (0.8462 − 0.0944j) 780  (0.2497 + 0.9813j)  (0.0674 + 0.1859j) (0.8462 + 0.3594j) 781  (0.4377 + 1.5927j)  (0.0674 − 0.1859j) (0.8462 + 0.1597j) 782  (−0.243 + 0.9898j) (−0.0674 + 0.1859j) (0.8462 + 0.4297j) 783 (−0.3635 + 1.4705j) (−0.0674 − 0.1859j) (0.8462 + 0.0937j) 784  (0.0552 + 1.0973j)  (0.1858 + 0.2349j) (0.8462 + 0.9504j) 785  (0.0692 + 1.3896j)  (0.1858 − 0.2349j) (0.8462 − 0.2918j) 786 (−0.0533 + 1.1004j) (−0.1858 + 0.2349j) (0.8462 + 1.3347j) 787 (−0.0645 + 1.3898j) (−0.1858 − 0.2349j) (0.8462 − 0.503j)  788  (0.3786 + 1.0415j)  (0.1264 + 0.2775j) (0.8462 − 0.946j)  789 (0.4427 + 1.209j)  (0.1264 − 0.2775j) (0.8462 − 0.8449j) 790  (−0.366 + 1.0374j) (−0.1264 + 0.2775j) (0.8462 − 1.331j)  791 (−0.4614 + 1.3126j) (−0.1264 − 0.2775j) (0.8462 − 0.5804j) 792  (0.0518 + 1.0143j)  (0.2228 + 0.2756j) (0.8462 + 0.8462j) 793  (0.0782 + 1.5127j)  (0.2228 − 0.2756j) (0.8462 − 0.2242j) 794  (−0.046 + 1.0123j) (−0.2228 + 0.2756j) (0.8462 + 0.5805j) 795 (−0.0701 + 1.5131j) (−0.2228 − 0.2756j) (0.8462 − 0.0332j) 796  (0.3459 + 0.9602j)  (0.1646 + 0.3239j) (0.8462 + 0.2916j) 797  (0.5834 + 1.5453j)  (0.1646 − 0.3239j) (0.8462 + 0.2239j) 798  (−0.339 + 0.9602j) (−0.1646 + 0.3239j) (0.8462 + 0.5035j) 799 (−0.5068 + 1.4274j) (−0.1646 − 0.3239j) (0.8462 + 0.0328j) 800  (0.1542 − 1.0848j)  (0.3621 + 0.4078j) (−0.2242 + 1.0626j)  801  (0.195 − 1.3776j)  (0.3621 − 0.4078j) (−0.2242 − 0.3591j)  802 (−0.1692 − 1.0862j) (−0.3621 + 0.4078j) (−0.2242 + 1.1878j)  803 (−0.2105 − 1.3753j) (−0.3621 − 0.4078j) (−0.2242 − 0.4301j)  804  (0.2571 − 1.0604j)  (0.2671 + 0.4864j) (−0.2242 − 1.058j)  805  (0.3269 − 1.3524j)  (0.2671 − 0.4864j) (−0.2242 − 0.7494j)  806 (−0.2773 − 1.0626j) (−0.2671 + 0.4864j) (−0.2242 − 1.1847j)  807 (−0.3392 − 1.3493j) (−0.2671 − 0.4864j) (−0.2242 − 0.6628j)  808  (0.1408 − 0.9984j)  (0.3557 + 0.4498j) (−0.2242 + 0.7523j)  809  (0.2184 − 1.4989j)  (0.3557 − 0.4498j) (−0.2242 − 0.1607j)  810 (−0.1557 − 0.9979j) (−0.3557 + 0.4498j) (−0.2242 + 0.6629j)  811 (−0.2305 − 1.4971j) (−0.3557 − 0.4498j) (−0.2242 − 0.0944j)  812 (0.2392 − 0.984j)  (0.3098 + 0.4844j) (−0.2242 + 0.3594j)  813  (0.3623 − 1.4708j)  (0.3098 − 0.4844j) (−0.2242 + 0.1597j)  814 (−0.2536 − 0.981j)  (−0.3098 + 0.4844j) (−0.2242 + 0.4297j)  815 (−0.3706 − 1.4687j) (−0.3098 − 0.4844j) (−0.2242 + 0.0937j)  816  (0.0449 − 1.0969j)  (0.3069 + 0.3625j) (−0.2242 + 0.9504j)  817  (0.0641 − 1.3898j)  (0.3069 − 0.3625j) (−0.2242 − 0.2918j)  818 (−0.0605 − 1.0926j) (−0.3069 + 0.3625j) (−0.2242 + 1.3347j)  819 (−0.0755 − 1.3893j) (−0.3069 − 0.3625j) (−0.2242 − 0.503j)  820  (0.3587 − 1.0333j)  (0.2448 + 0.4128j) (−0.2242 − 0.946j)  821  (0.4569 − 1.3142j)  (0.2448 − 0.4128j) (−0.2242 − 0.8449j)  822  (−0.378 − 1.0328j) (−0.2448 + 0.4128j) (−0.2242 − 1.331j)  823 (−0.4736 − 1.3082j) (−0.2448 − 0.4128j) (−0.2242 − 0.5804j)  824  (0.0429 − 1.0191j)  (0.2662 + 0.3202j) (−0.2242 + 0.8462j)  825  (0.0686 − 1.5132j)  (0.2662 − 0.3202j) (−0.2242 − 0.2242j)  826 (−0.0648 − 1.0092j) (−0.2662 + 0.3202j) (−0.2242 + 0.5805j)  827 (−0.0795 − 1.5126j) (−0.2662 − 0.3202j) (−0.2242 − 0.0332j)  828  (0.3307 − 0.9507j) (0.2125 + 0.367j) (−0.2242 + 0.2916j)  829  (0.5016 − 1.4293j) (0.2125 − 0.367j) (−0.2242 + 0.2239j)  830 (−0.3502 − 0.9508j) (−0.2125 + 0.367j)  (−0.2242 + 0.5035j)  831 (−0.5177 − 1.4235j) (−0.2125 − 0.367j)  (−0.2242 + 0.0328j)  832  (1.0784 + 0.1597j)  (0.1893 + 0.1475j) (0.5805 + 1.0626j) 833  (1.2742 + 0.1847j)  (0.1893 − 0.1475j) (0.5805 − 0.3591j) 834 (−1.0825 + 0.1662j) (−0.1893 + 0.1475j) (0.5805 + 1.1878j) 835 (−1.3752 + 0.2111j) (−0.1893 − 0.1475j) (0.5805 − 0.4301j) 836  (1.0563 + 0.2659j)  (0.2314 + 0.0941j) (0.5805 − 1.058j)  837  (1.2502 + 0.3076j)  (0.2314 − 0.0941j) (0.5805 − 0.7494j) 838 (−1.0638 + 0.2757j) (−0.2314 + 0.0941j) (0.5805 − 1.1847j) 839 (−1.3486 + 0.3422j) (−0.2314 − 0.0941j) (0.5805 − 0.6628j) 840  (0.9951 + 0.1479j)  (0.1398 + 0.0991j) (0.5805 + 0.7523j) 841  (1.3773 + 0.1969j)  (0.1398 − 0.0991j) (0.5805 − 0.1607j) 842 (−1.0058 + 0.1556j) (−0.1398 + 0.0991j) (0.5805 + 0.6629j) 843 (−1.4969 + 0.2316j) (−0.1398 − 0.0991j) (0.5805 − 0.0944j) 844 (0.9768 + 0.245j)  (0.1843 + 0.0666j) (0.5805 + 0.3594j) 845  (1.3521 + 0.3281j)  (0.1843 − 0.0666j) (0.5805 + 0.1597j) 846 (−0.9837 + 0.2569j) (−0.1843 + 0.0666j) (0.5805 + 0.4297j) 847 (−1.4666 + 0.3789j) (−0.1843 − 0.0666j) (0.5805 + 0.0937j) 848  (1.0838 + 0.0529j)  (0.2352 + 0.1848j) (0.5805 + 0.9504j) 849  (1.2863 + 0.0567j)  (0.2352 − 0.1848j) (0.5805 − 0.2918j) 850 (−1.0962 + 0.0587j) (−0.2352 + 0.1848j) (0.5805 + 1.3347j) 851 (−1.3895 + 0.0714j) (−0.2352 − 0.1848j) (0.5805 − 0.503j)  852  (1.0289 + 0.3656j)  (0.2771 + 0.1258j) (0.5805 − 0.946j)  853  (1.2154 + 0.4249j)  (0.2771 − 0.1258j) (0.5805 − 0.8449j) 854 (−1.0295 + 0.3802j) (−0.2771 + 0.1258j) (0.5805 − 1.331j)  855 (−1.3075 + 0.4757j) (−0.2771 − 0.1258j) (0.5805 − 0.5804j) 856  (1.006 + 0.0523j)  (0.2763 + 0.2225j) (0.5805 + 0.8462j) 857    (1.39 + 0.0615j)  (0.2763 − 0.2225j) (0.5805 − 0.2242j) 858 (−1.0152 + 0.0528j) (−0.2763 + 0.2225j) (0.5805 + 0.5805j) 859 (−1.5125 + 0.0817j) (−0.2763 − 0.2225j) (0.5805 − 0.0332j) 860  (0.9507 + 0.3372j)  (0.3242 + 0.1645j) (0.5805 + 0.2916j) 861 (1.3152 + 0.454j)  (0.3242 − 0.1645j) (0.5805 + 0.2239j) 862 (−0.9467 + 0.3511j) (−0.3242 + 0.1645j) (0.5805 + 0.5035j) 863 (−1.4226 + 0.5201j) (−0.3242 − 0.1645j) (0.5805 + 0.0328j) 864  (1.0752 − 0.1571j)  (0.4086 + 0.3619j) (−0.0332 + 1.0626j)  865  (1.2735 − 0.1898j)  (0.4086 − 0.3619j) (−0.0332 − 0.3591j)  866 (−1.0862 − 0.1623j) (−0.4086 + 0.3619j) (−0.0332 + 1.1878j)  867 (−1.3769 − 0.1999j) (−0.4086 − 0.3619j) (−0.0332 − 0.4301j)  868  (1.0539 − 0.2656j)  (0.4865 + 0.2669j) (−0.0332 − 1.058j)  869  (1.2487 − 0.3136j)  (0.4865 − 0.2669j) (−0.0332 − 0.7494j)  870 (−1.0604 − 0.2658j) (−0.4865 + 0.2669j) (−0.0332 − 1.1847j)  871 (−1.3511 − 0.3321j) (−0.4865 − 0.2669j) (−0.0332 − 0.6628j)  872  (0.988 − 0.1488j)  (0.4504 + 0.3557j) (−0.0332 + 0.7523j)  873  (1.3763 − 0.2037j)  (0.4504 − 0.3557j) (−0.0332 − 0.1607j)  874 (−1.0072 − 0.1479j) (−0.4504 + 0.3557j) (−0.0332 + 0.6629j)  875 (−1.4996 − 0.2134j) (−0.4504 − 0.3557j) (−0.0332 − 0.0944j)  876 (0.9724 − 0.247j)  (0.4847 + 0.3094j) (−0.0332 + 0.3594j)  877  (1.3498 − 0.3374j)  (0.4847 − 0.3094j) (−0.0332 + 0.1597j)  878 (−0.9882 − 0.2467j) (−0.4847 + 0.3094j) (−0.0332 + 0.4297j)  879 (−1.4708 − 0.3622j) (−0.4847 − 0.3094j) (−0.0332 + 0.0937j)  880  (1.089 − 0.0592j)  (0.363 + 0.3068j) (−0.0332 + 0.9504j)  881  (1.2859 − 0.0654j)  (0.363 − 0.3068j) (−0.0332 − 0.2918j)  882  (−1.093 − 0.0536j)  (−0.363 + 0.3068j) (−0.0332 + 1.3347j)  883 (−1.3899 − 0.0633j)  (−0.363 − 0.3068j) (−0.0332 − 0.503j)  884  (1.0253 − 0.3732j)  (0.4129 + 0.2445j) (−0.0332 − 0.946j)  885  (1.2132 − 0.4312j)  (0.4129 − 0.2445j) (−0.0332 − 0.8449j)  886 (−1.0408 − 0.3706j) (−0.4129 + 0.2445j) (−0.0332 − 1.331j)  887 (−1.3113 − 0.4649j) (−0.4129 − 0.2445j) (−0.0332 − 0.5804j)  888  (1.0092 − 0.0483j)  (0.3205 + 0.2657j) (−0.0332 + 0.8462j)  889  (1.3895 − 0.0711j)  (0.3205 − 0.2657j) (−0.0332 − 0.2242j)  890 (−1.0172 − 0.0485j) (−0.3205 + 0.2657j) (−0.0332 + 0.5805j)  891 (−1.5133 − 0.0646j) (−0.3205 − 0.2657j) (−0.0332 − 0.0332j)  892  (0.9458 − 0.3399j)  (0.3674 + 0.2122j) (−0.0332 + 0.2916j)  893  (1.3103 − 0.4677j)  (0.3674 − 0.2122j) (−0.0332 + 0.2239j)  894 (−0.9545 − 0.3424j) (−0.3674 + 0.2122j) (−0.0332 + 0.5035j)  895 (−1.4303 − 0.4985j) (−0.3674 − 0.2122j) (−0.0332 + 0.0328j)  896  (0.6532 + 0.8818j)  (0.8022 + 0.8857j) (0.2916 + 1.0626j) 897  (0.7689 + 1.0327j)  (0.8022 − 0.8857j) (0.2916 − 0.3591j) 898 (−0.6455 + 0.8871j) (−0.8022 + 0.8857j) (0.2916 + 1.1878j) 899 (−0.8234 + 1.1215j) (−0.8022 − 0.8857j) (0.2916 − 0.4301j) 900  (0.5646 + 0.9425j)  (0.506 + 1.0783j) (0.2916 − 1.058j)  901  (0.6666 + 1.1015j)  (0.506 − 1.0783j) (0.2916 − 0.7494j) 902 (−0.5563 + 0.9462j)  (−0.506 + 1.0783j) (0.2916 − 1.1847j) 903 (−0.7067 + 1.1985j)  (−0.506 − 1.0783j) (0.2916 − 0.6628j) 904  (0.6029 + 0.8146j)  (0.7104 + 0.9607j) (0.2916 + 0.7523j) 905  (0.9883 + 1.3235j)  (0.7104 − 0.9607j) (0.2916 − 0.1607j) 906 (−0.5945 + 0.8251j) (−0.7104 + 0.9607j) (0.2916 + 0.6629j) 907 (−0.8944 + 1.2224j) (−0.7104 − 0.9607j) (0.2916 − 0.0944j) 908  (0.5233 + 0.8676j)  (0.6108 + 1.0246j) (0.2916 + 0.3594j) 909  (0.8662 + 1.4065j)  (0.6108 − 1.0246j) (0.2916 + 0.1597j) 910 (−0.5133 + 0.8727j) (−0.6108 + 1.0246j) (0.2916 + 0.4297j) 911 (−0.7718 + 1.3033j) (−0.6108 − 1.0246j) (0.2916 + 0.0937j) 912  (0.7297 + 0.8077j)  (0.7434 + 0.8215j) (0.2916 + 0.9504j) 913  (0.8724 + 0.9469j)  (0.7434 − 0.8215j) (0.2916 − 0.2918j) 914  (−0.729 + 0.8128j) (−0.7434 + 0.8215j) (0.2916 + 1.3347j) 915  (−0.929 + 1.0357j) (−0.7434 − 0.8215j) (0.2916 − 0.503j)  916  (0.4763 + 0.9931j)  (0.4684 + 0.9992j) (0.2916 − 0.946j)  917  (0.5541 + 1.1622j)  (0.4684 − 0.9992j) (0.2916 − 0.8449j) 918 (−0.4616 + 0.9907j) (−0.4684 + 0.9992j) (0.2916 − 1.331j)  919 (−0.5872 + 1.2613j) (−0.4684 − 0.9992j) (0.2916 − 0.5804j) 920  (0.6768 + 0.7481j)  (0.6577 + 0.8905j) (0.2916 + 0.8462j) 921  (1.1181 + 1.2159j)  (0.6577 − 0.8905j) (0.2916 − 0.2242j) 922 (−0.6755 + 0.7585j) (−0.6577 + 0.8905j) (0.2916 + 0.5805j) 923 (−1.0129 + 1.1262j) (−0.6577 − 0.8905j) (0.2916 − 0.0332j) 924  (0.4387 + 0.9208j)  (0.5657 + 0.9496j) (0.2916 + 0.2916j) 925  (0.7372 + 1.4782j)  (0.5657 − 0.9496j) (0.2916 + 0.2239j) 926 (−0.4289 + 0.9212j) (−0.5657 + 0.9496j) (0.2916 + 0.5035j) 927 (−0.6488 + 1.3687j) (−0.5657 − 0.9496j) (0.2916 + 0.0328j) 928 (0.6479 − 0.882j)  (0.8652 + 0.9554j) (0.2239 + 1.0626j) 929  (0.7639 − 1.0364j)  (0.8652 − 0.9554j) (0.2239 − 0.3591j) 930 (−0.6553 − 0.8759j) (−0.8652 + 0.9554j) (0.2239 + 1.1878j) 931 (−0.8344 − 1.1133j) (−0.8652 − 0.9554j) (0.2239 − 0.4301j) 932  (0.5559 − 0.9472j)  (0.5472 + 1.1638j) (0.2239 − 1.058j)  933  (0.6621 − 1.1042j)  (0.5472 − 1.1638j) (0.2239 − 0.7494j) 934 (−0.5669 − 0.9389j) (−0.5472 + 1.1638j) (0.2239 − 1.1847j) 935 (−0.7239 − 1.1881j) (−0.5472 − 1.1638j) (0.2239 − 0.6628j) 936  (0.5907 − 0.8185j)  (0.7666 + 1.0364j) (0.2239 + 0.7523j) 937 (0.9877 − 1.324j)  (0.7666 − 1.0364j) (0.2239 − 0.1607j) 938 (−0.6059 − 0.8127j) (−0.7666 + 1.0364j) (0.2239 + 0.6629j) 939 (−0.9008 − 1.2178j) (−0.7666 − 1.0364j) (0.2239 − 0.0944j) 940  (0.5129 − 0.8711j)  (0.6592 + 1.1052j) (0.2239 + 0.3594j) 941  (0.8612 − 1.4095j)  (0.6592 − 1.1052j) (0.2239 + 0.1597j) 942 (−0.5256 − 0.8663j) (−0.6592 + 1.1052j) (0.2239 + 0.4297j) 943 (−0.7915 − 1.2915j) (−0.6592 − 1.1052j) (0.2239 + 0.0937j) 944  (0.7269 − 0.8184j)  (0.9339 + 1.0315j) (0.2239 + 0.9504j) 945  (0.8653 − 0.9534j)  (0.9339 − 1.0315j) (0.2239 − 0.2918j) 946 (−0.7372 − 0.807j)  (−0.9339 + 1.0315j) (0.2239 + 1.3347j) 947 (−0.9334 − 1.0318j) (−0.9339 − 1.0315j) (0.2239 − 0.503j)  948  (0.4592 − 0.9935j)  (0.5914 + 1.2566j) (0.2239 − 0.946j)  949 (0.5837 − 1.263j)  (0.5914 − 1.2566j) (0.2239 − 0.8449j) 950 (−0.4801 − 0.9887j) (−0.5914 + 1.2566j) (0.2239 − 1.331j)  951 (−0.6002 − 1.2552j) (−0.5914 − 1.2566j) (0.2239 − 0.5804j) 952  (0.6671 − 0.7639j)  (0.8275 + 1.1188j) (0.2239 + 0.8462j) 953  (1.1142 − 1.2194j)  (0.8275 − 1.1188j) (0.2239 − 0.2242j) 954 (−0.6836 − 0.744j)  (−0.8275 + 1.1188j) (0.2239 + 0.5805j) 955 (−1.0229 − 1.1172j) (−0.8275 − 1.1188j) (0.2239 − 0.0332j) 956  (0.4203 − 0.9175j) (0.7127 + 1.193j) (0.2239 + 0.2916j) 957  (0.7214 − 1.4859j) (0.7127 − 1.193j) (0.2239 + 0.2239j) 958 (−0.4409 − 0.9147j) (−0.7127 + 1.193j)  (0.2239 + 0.5035j) 959 (−0.6634 − 1.3617j) (−0.7127 − 1.193j)  (0.2239 + 0.0328j) 960 (0.8769 + 0.647j)  (0.8858 + 0.8019j) (0.5035 + 1.0626j) 961  (1.0411 + 0.7574j)  (0.8858 − 0.8019j) (0.5035 − 0.3591j) 962 (−0.8744 + 0.6624j) (−0.8858 + 0.8019j) (0.5035 + 1.1878j) 963 (−1.1172 + 0.8293j) (−0.8858 − 0.8019j) (0.5035 − 0.4301j) 964  (0.9383 + 0.5578j)  (1.0787 + 0.5061j) (0.5035 − 1.058j)  965  (1.1115 + 0.6498j)  (1.0787 − 0.5061j) (0.5035 − 0.7494j) 966 (−0.9375 + 0.5721j) (−1.0787 + 0.5061j) (0.5035 − 1.1847j) 967 (−1.1891 + 0.7224j) (−1.0787 − 0.5061j) (0.5035 − 0.6628j) 968  (0.814 + 0.5948j)  (0.9607 + 0.7095j) (0.5035 + 0.7523j) 969  (1.1276 + 0.8151j)  (0.9607 − 0.7095j) (0.5035 − 0.1607j) 970 (−0.8049 + 0.6104j) (−0.9607 + 0.7095j) (0.5035 + 0.6629j) 971 (−1.2139 + 0.906j)  (−0.9607 − 0.7095j) (0.5035 − 0.0944j) 972  (0.8693 + 0.5177j)  (1.025 + 0.6104j) (0.5035 + 0.3594j) 973  (1.2028 + 0.6993j)  (1.025 − 0.6104j) (0.5035 + 0.1597j) 974 (−0.8649 + 0.528j)   (−1.025 + 0.6104j) (0.5035 + 0.4297j) 975 (−1.2958 + 0.7845j)  (−1.025 − 0.6104j) (0.5035 + 0.0937j) 976  (0.8089 + 0.7301j)  (0.8214 + 0.7431j) (0.5035 + 0.9504j) 977 (0.9582 + 0.86j)   (0.8214 − 0.7431j) (0.5035 − 0.2918j) 978 (−0.8061 + 0.7389j) (−0.8214 + 0.7431j) (0.5035 + 1.3347j) 979 (−1.0319 + 0.9333j) (−0.8214 − 0.7431j) (0.5035 − 0.503j)  980  (0.9923 + 0.4623j)  (0.9992 + 0.4681j) (0.5035 − 0.946j)  981 (1.1683 + 0.541j)  (0.9992 − 0.4681j) (0.5035 − 0.8449j) 982 (−0.9856 + 0.4757j) (−0.9992 + 0.4681j) (0.5035 − 1.331j)  983 (−1.2561 + 0.5982j) (−0.9992 − 0.4681j) (0.5035 − 0.5804j) 984  (0.7466 + 0.6777j)  (0.8906 + 0.6574j) (0.5035 + 0.8462j) 985  (1.0453 + 0.9182j)  (0.8906 − 0.6574j) (0.5035 − 0.2242j) 986 (−0.7472 + 0.6886j) (−0.8906 + 0.6574j) (0.5035 + 0.5805j) 987 (−1.1228 + 1.0167j) (−0.8906 − 0.6574j) (0.5035 − 0.0332j) 988  (0.9147 + 0.4298j)  (0.9499 + 0.5651j) (0.5035 + 0.2916j) 989  (1.2633 + 0.5829j)  (0.9499 − 0.5651j) (0.5035 + 0.2239j) 990 (−0.9119 + 0.4417j) (−0.9499 + 0.5651j) (0.5035 + 0.5035j) 991 (−1.3666 + 0.6533j) (−0.9499 − 0.5651j) (0.5035 + 0.0328j) 992 (0.8655 − 0.653j)  (0.9556 + 0.8647j) (0.0328 + 1.0626j) 993  (1.0331 − 0.7683j)  (0.9556 − 0.8647j) (0.0328 − 0.3591j) 994 (−0.8785 − 0.6522j) (−0.9556 + 0.8647j) (0.0328 + 1.1878j) 995 (−1.1227 − 0.8217j) (−0.9556 − 0.8647j) (0.0328 − 0.4301j) 996  (0.9319 − 0.5627j)  (1.1638 + 0.5473j) (0.0328 − 1.058j)  997  (1.1045 − 0.6616j)  (1.1638 − 0.5473j) (0.0328 − 0.7494j) 998  (−0.938 − 0.5631j) (−1.1638 + 0.5473j) (0.0328 − 1.1847j) 999 (−1.1945 − 0.7134j) (−1.1638 − 0.5473j) (0.0328 − 0.6628j) 1000  (0.8033 − 0.6019j)  (1.0357 + 0.7657j) (0.0328 + 0.7523j) 1001  (1.1238 − 0.8203j)  (1.0357 − 0.7657j) (0.0328 − 0.1607j) 1002 (−0.8138 − 0.6023j) (−1.0357 + 0.7657j) (0.0328 + 0.6629j) 1003 (−1.2205 − 0.8971j) (−1.0357 − 0.7657j) (0.0328 − 0.0944j) 1004  (0.8538 − 0.5249j)  (1.1055 + 0.6592j) (0.0328 + 0.3594j) 1005  (1.1972 − 0.7089j)  (1.1055 − 0.6592j) (0.0328 + 0.1597j) 1006 (−0.8684 − 0.5228j) (−1.1055 + 0.6592j) (0.0328 + 0.4297j) 1007 (−1.3042 − 0.7704j) (−1.1055 − 0.6592j) (0.0328 + 0.0937j) 1008  (0.8025 − 0.7331j)  (1.0309 + 0.9337j) (0.0328 + 0.9504j) 1009 (0.9536 − 0.865j)  (1.0309 − 0.9337j) (0.0328 − 0.2918j) 1010 (−0.8166 − 0.7338j) (−1.0309 + 0.9337j) (0.0328 + 1.3347j) 1011 (−1.0327 − 0.9324j) (−1.0309 − 0.9337j) (0.0328 − 0.503j)  1012  (0.9794 − 0.4689j)  (1.2567 + 0.5915j) (0.0328 − 0.946j)  1013  (1.1627 − 0.5531j)  (1.2567 − 0.5915j) (0.0328 − 0.8449j) 1014 (−0.9855 − 0.4624j) (−1.2567 + 0.5915j) (0.0328 − 1.331j)  1015 (−1.2569 − 0.5967j) (−1.2567 − 0.5915j) (0.0328 − 0.5804j) 1016  (0.7398 − 0.6807j)  (1.1183 + 0.8269j) (0.0328 + 0.8462j) 1017  (1.0371 − 0.9274j)  (1.1183 − 0.8269j) (0.0328 − 0.2242j) 1018 (−0.7514 − 0.6796j) (−1.1183 + 0.8269j) (0.0328 + 0.5805j) 1019 (−1.1271 − 1.0119j) (−1.1183 − 0.8269j) (0.0328 − 0.0332j) 1020  (0.905 − 0.437j)  (1.193 + 0.7123j) (0.0328 + 0.2916j) 1021  (1.259 − 0.5921j)  (1.193 − 0.7123j) (0.0328 + 0.2239j) 1022 (−0.9134 − 0.4372j)  (−1.193 + 0.7123j) (0.0328 + 0.5035j) 1023 (−1.3709 − 0.6442j)  (−1.193 − 0.7123j) (0.0328 + 0.0328j)

Modulation & Coding Schemes

As described above, an optimal modulation constellation along with bit-to-symbol mapping can be different depending on situations such as the channel conditions, channel coding rate, transmission signal power, etc., and can be adaptively applied through coordination between the transmitting and receiving entities. In cellular communication systems, the base station (gNB) can inform to the mobile terminal (UE) of which modulation and channel coding scheme(s) (MCSs) are applied to the corresponding data transmission from the gNB to the UE (downlink) or from the UE to the gNB (uplink). In sidelink communications, a transmitting UE can signal to another (receiving) UE the MCS for the corresponding communication between the UEs.

As an embodiment of the MCS signaling, a modulation format and an MCS indication table can be defined as follows:

TABLE 10 Modulation index Modulation Format Modulation Modulation Index (1 or 2) for a Index Order given modulation order 0 4-ary (QPSK) — 1 16-ary 1 2 16-ary 2 3 64-ary 1 4 64-ary 2 5 256-ary  1 6 256-ary  2 7 1024-ary  1 8 1024-ary  2

In TABLE 10, two modulation formats are assumed to be adopted for the respective modulation orders of 64, 256, and 1024, and only QPSK modulation is adopted for the modulation order of 4. The 64/256/1024-ary modulations can be selected from the examples presented above, or one of the two modulations for a given order can be the square QAM modulation. Once two modulation formats are determined for a given modulation order, the index 1 or 2 can be assigned to the two selected modulation formats, which is indicated in the last column in TABLE 10. The modulation index in TABLE 10 can uniquely determine the modulation order and the format (constellation, bit-to-symbol mapping), and is linked to the MC index in TABLE 11:

TABLE 11 MCS index MCS Modulation Spectral efficiency index index parameter 0 0 r0 1 0 r1 2 0 r2 3 0 r3 4 0 r4 5 0 r5 6 1 r6 7 1 r7 8 1 r8 9 2 r9 10 2 r10 11 2 r11 12 3 r12 13 3 r13 14 3 r14 15 4 r15 16 4 r16 17 4 r17 18 5 r18 19 5 r19 20 5 r20 21 6 r21 22 6 r22 23 6 r23 24 7 r24 25 7 r25 26 7 r26 27 8 r27 28 8 r28 29 8 r29 30 reserved 31 reserved

The mapping between the MCS index and the modulation index in TABLE 11 is an example, and the range of the MCS index and the mapping between the MCS index and the modulation format can be differently defined depending on cases. The spectral efficiency parameter in the last column in TABLE 11 can determine the channel coding rate to be applied to the transmitted data, which can be represented by the channel coding rate or by a different type of value or index related to the spectral efficiency of the transmission. The mapping between the MCS index, the modulation index and the spectral efficiency parameter may be defined such that the modulation and coding formats corresponding to the MCS index can secure a reliable communication between the transmitting and receiving entities for the given situation.

In cellular commination systems, the gNB can indicate the MCS index to the UE for a corresponding downlink or uplink transmission. In broadcast communication systems, the transmitting entity for the broadcast can inform to the receivers the MCS index of the corresponding transmission.

For illustrative purposes the steps of algorithms above are described serially. However, some of these steps may be performed in parallel to each other. The operation diagrams illustrate example methods that can be implemented in accordance with the principles of the present disclosure and various changes could be made to the methods illustrated in the flowcharts. For example, while shown as a series of steps, various steps in each figure could overlap, occur in parallel, occur in a different order, or occur multiple times. In another example, steps may be omitted or replaced by other steps.

Although this disclosure has been described with an exemplary embodiment, various changes and modifications may be suggested to one skilled in the art. It is intended that this disclosure encompass such changes and modifications as fall within the scope of the appended claims.