Predictive Coding of Bit Loading for Time-Correlated MIMO Channels With a Decision Feedback Receiver

In this paper, we consider variable-rate transmission over a slowly varying multiple-input multiple-output (MIMO) channel with a decision feedback receiver. The transmission rate is adapted to the channel by dynamically assigning bits to the subchannels of the MIMO system. Predictive quantization is used for the feedback of bit loading to take advantage of the time correlation inherited from the temporally correlated channel. Due to the use of decision feedback at the receiver, the bit loading is related to the Cholesky decomposition of the channel Gram matrix. Assuming the channel is modeled by a slowly varying Gauss-Markov process, we show that the nested submatrices generated during the process of Cholesky decomposition can be updated as time evolves. Based on the update, we derive the optimal predictor of the next bit loading for predictive quantization. Furthermore, we derive the statistics of the prediction error, which are then exploited to design the quantizer to achieve a smaller quantization error. Simulations are given to demonstrate that the proposed predictive quantization gives a good approximation of the desired transmission rate with a low feedback rate.

[1]  Robert H. Halstead,et al.  Matrix Computations , 2011, Encyclopedia of Parallel Computing.

[2]  Gordon L. Stüber Principles of mobile communication , 1996 .

[3]  Reinaldo A. Valenzuela,et al.  V-BLAST: an architecture for realizing very high data rates over the rich-scattering wireless channel , 1998, 1998 URSI International Symposium on Signals, Systems, and Electronics. Conference Proceedings (Cat. No.98EX167).

[4]  Lei Li,et al.  Link Adaptation for Spatial Modulation With Limited Feedback , 2012, IEEE Transactions on Vehicular Technology.

[5]  Lingyang Song,et al.  On the Minimum Differential Feedback for Time-Correlated MIMO Rayleigh Block-Fading Channels , 2010, IEEE Transactions on Communications.

[6]  R. Heath,et al.  Limited feedback unitary precoding for spatial multiplexing systems , 2005, IEEE Transactions on Information Theory.

[7]  Yuan-Pei Lin,et al.  Variable-Rate Transmission for MIMO Time-Correlated Channels With Limited Feedback , 2014, IEEE Transactions on Signal Processing.

[8]  John M. Cioffi,et al.  Joint Tx-Rx beamforming design for multicarrier MIMO channels: a unified framework for convex optimization , 2003, IEEE Trans. Signal Process..

[9]  Jeffrey G. Andrews,et al.  Limited Feedback Beamforming Over Temporally-Correlated Channels , 2009, IEEE Transactions on Signal Processing.

[10]  P. P. Vaidyanathan,et al.  MIMO Transceivers With Decision Feedback and Bit Loading: Theory and Optimization , 2010, IEEE Transactions on Signal Processing.

[11]  Mohamed-Slim Alouini,et al.  Adaptive Modulation over Nakagami Fading Channels , 2000, Wirel. Pers. Commun..

[12]  Bruno Clerckx,et al.  A New Design of Polar-Cap Differential Codebook for Temporally/Spatially Correlated MISO Channels , 2012, IEEE Transactions on Wireless Communications.

[13]  Anna Scaglione,et al.  Optimal designs for space-time linear precoders and decoders , 2002, IEEE Trans. Signal Process..

[14]  G. Blelloch Introduction to Data Compression * , 2022 .

[15]  Bruno Clerckx,et al.  MIMO Systems with Limited Rate Differential Feedback in Slowly Varying Channels , 2011, IEEE Transactions on Communications.

[16]  Guidelines for evaluation of radio interface technologies for IMT-Advanced , 2008 .

[17]  Robert W. Heath,et al.  Interpolation Based Unitary Precoding for Spatial Multiplexing MIMO-OFDM With Limited Feedback , 2006, IEEE Trans. Signal Process..

[18]  Khalid Sayood,et al.  Introduction to data compression (2nd ed.) , 2000 .

[19]  Georgios B. Giannakis,et al.  Adaptive MIMO-OFDM based on partial channel state information , 2004, IEEE Transactions on Signal Processing.

[20]  John M. Cioffi,et al.  A Discrete Multitone Transceiver System for HDSL Applications , 1991, IEEE J. Sel. Areas Commun..

[21]  See-May Phoong,et al.  Statistical Bit Allocation and Statistical Precoding for Correlated MIMO Channels With Decision Feedback , 2012, IEEE Signal Processing Letters.

[22]  Angel E. Lozano,et al.  Approaching eigenmode BLAST channel capacity using V-BLAST with rate and power feedback , 2001, IEEE 54th Vehicular Technology Conference. VTC Fall 2001. Proceedings (Cat. No.01CH37211).

[23]  Petre Stoica,et al.  Generalized linear precoder and decoder design for MIMO channels using the weighted MMSE criterion , 2001, IEEE Trans. Commun..

[24]  Bhaskar D. Rao,et al.  Design and Analysis of MIMO Spatial Multiplexing Systems With Quantized Feedback , 2006, IEEE Transactions on Signal Processing.

[25]  S. Kay Fundamentals of statistical signal processing: estimation theory , 1993 .

[26]  P. P. Vaidyanathan,et al.  Optimization of transceivers with bit allocation to maximize bit rate for MIMO transmission , 2009, IEEE Transactions on Communications.

[27]  Torbjörn Ekman,et al.  Parametrization Based Limited Feedback Design for Correlated MIMO Channels Using New Statistical Models , 2013, IEEE Transactions on Wireless Communications.

[28]  G.D. Forney,et al.  Combined equalization and coding using precoding , 1991, IEEE Communications Magazine.

[29]  Robert W. Heath,et al.  An overview of limited feedback in wireless communication systems , 2008, IEEE Journal on Selected Areas in Communications.

[30]  Christoph Meinel,et al.  Digital Communication , 2014, X.media.publishing.

[31]  Michael L. Honig,et al.  Capacity of a Multiple-Antenna Fading Channel With a Quantized Precoding Matrix , 2007, IEEE Transactions on Information Theory.

[32]  Gene H. Golub,et al.  Matrix computations (3rd ed.) , 1996 .

[33]  Zhi-Quan Luo,et al.  Minimum BER block precoders for zero-forcing equalization , 2002, 2002 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[34]  Lin Dai,et al.  Low complexity per-antenna rate and power control approach for closed-loop V-BLAST , 2003, IEEE Trans. Commun..

[35]  D Sacristán-Murga,et al.  Differential Feedback of MIMO Channel Gram Matrices Based on Geodesic Curves , 2010, IEEE Transactions on Wireless Communications.

[36]  Andrea J. Goldsmith,et al.  Variable-rate variable-power MQAM for fading channels , 1997, IEEE Trans. Commun..

[37]  David Tse,et al.  Degrees of freedom in some underspread MIMO fading channels , 2006, IEEE Transactions on Information Theory.

[38]  Qinghua Li,et al.  MIMO precoding in 802.16e WiMAX , 2007, Journal of Communications and Networks.

[39]  Yuan-Pei Lin,et al.  Bit Allocation and Statistical Precoding for Correlated MIMO Channels With Limited Feedback , 2012, IEEE Transactions on Vehicular Technology.