BER Analysis of the box relaxation for BPSK Signal Recovery

Abstract

We study the problem of recovering an n-dimensional vector of \1\n (BPSK) signals from m noise corrupted measurements y=Ax0+z. In particular, we consider the box relaxation method which relaxes the discrete set \1\n to the convex set [-1,1]n to obtain a convex optimization algorithm followed by hard thresholding. When the noise z and measurement matrix A have iid standard normal entries, we obtain an exact expression for the bit-wise probability of error Pe in the limit of n and m growing and mn fixed. At high SNR our result shows that the Pe of box relaxation is within 3dB of the matched filter bound MFB for square systems, and that it approaches MFB as m grows large compared to n. Our results also indicates that as m,n→∞, for any fixed set of size k, the error events of the corresponding k bits in the box relaxation method are independent.