One-Bit Null Space Learning for MIMO underlay cognitive radio

We present a new algorithm, called the One-Bit Null Space Learning Algorithm (OBNSLA), for MIMO cognitive radio Secondary Users (SU) to learn the null space of the interference channel to the Primary User (PU). The SU observes a binary function that indicates whether the interference it inflicts on the PU has increased or decreased in comparison to the SU's previous transmitted signal. This function is obtained by listening to the PU's transmitted signal or control channel and extracting information from it about whether the PU's Signal to Interference plus Noise power Ratio has increased or decreased. In addition to introducing the OBNSLA, the paper provides a thorough convergence analysis of this algorithm. The OBNSLA is shown to have a linear convergence rate and an asymptotic quadratic convergence rate.

[1]  B. Parlett The Symmetric Eigenvalue Problem , 1981 .

[2]  G. Forsythe,et al.  The cyclic Jacobi method for computing the principal values of a complex matrix , 1960 .

[3]  Gene H. Golub,et al.  Matrix computations , 1983 .

[4]  Andrea J. Goldsmith,et al.  The One-Bit Null Space Learning Algorithm and Its Convergence , 2013, IEEE Transactions on Signal Processing.

[5]  Cheng-Xiang Wang,et al.  Interference Mitigation for Cognitive Radio MIMO Systems Based on Practical Precoding , 2011, Phys. Commun..

[6]  K. V. Fernando Linear convergence of the row cyclic Jacobi and Kogbetliantz methods , 1989 .

[7]  Andrea J. Goldsmith,et al.  Blind Null-Space Learning for MIMO Underlay Cognitive Radio with Primary User Interference Adaptation , 2013, IEEE Transactions on Wireless Communications.

[8]  Norman C. Beaulieu,et al.  Novel Sum-of-Sinusoids Simulation Models for Rayleigh and Rician Fading Channels , 2006, IEEE Transactions on Wireless Communications.

[9]  Ying-Chang Liang,et al.  Design of Learning-Based MIMO Cognitive Radio Systems , 2009, IEEE Transactions on Vehicular Technology.

[10]  J. H. Wilkinson Note on the quadratic convergence of the cyclic Jacobi process , 1962 .

[11]  Peter Henrici,et al.  An estimate for the norms of certain cyclic Jacobi operators , 1968 .

[12]  R. Brent,et al.  The Solution of Singular-Value and Symmetric Eigenvalue Problems on Multiprocessor Arrays , 1985 .

[13]  Huiyue Yi Nullspace-Based Secondary Joint Transceiver Scheme for Cognitive Radio MIMO Networks Using Second-Order Statistics , 2010, 2010 IEEE International Conference on Communications.

[14]  P. Henrici On the Speed of Convergence of Cyclic and Quasicyclic Jacobi Methods for Computing Eigenvalues of Hermitian Matrices , 1958 .

[15]  V. Hari On sharp quadratic convergence bounds for the serial Jacobi methods , 1991 .