Binary Signal Recovery in Undersampling: Iterative SDP with Majority Voting and Successive Interference Cancellation

Abstract

Binary compressive sensing (BCS) seeks to recover a k-sparse binary vector of length n from m linear measurements. Classical CS guarantees break down for m < k and convex/greedy BCS algorithms with random Gaussian sensing matrices perform poorly. We introduce ISDP-MVSIC, which combines randomized semidefinite programming (SDP) sampling, majority voting (MV) and successive interference cancellation (SIC) across L n stages, wrapped in a residual-cost driven retry loop. The method exposes a tunable complexity--performance trade-off: for n=100, 144, raising the worst-case complexity Cmax from 7.9 × 109 to 2.0 × 1010 enables empirical exact recovery over m/k ∈ [0.4,5.0] as the sparsity ratio s=k/n decreases from 0.5 to 0.1, by practically targeting the undersampled regime.