Stable Recovery of Sparse Signals via lp-Minimization

Abstract

In this paper, we show that, under the assumption that \|\|2≤ ε, every k-sparse signal ∈ Rn can be stably (ε≠0) or exactly recovered (ε=0) from =+ via lp-mnimization with p∈(0, p], where p= cases 5031(1-δ2k), &δ2k∈[22, 0.7183) 0.4541, &δ2k∈[0.7183,0.7729) 2(1-δ2k), &δ2k∈[0.7729,1) cases, even if the restricted isometry constant of satisfies δ2k∈[22, 1). Furthermore, under the assumption that n≤ 4k, we show that the range of p can be further improved to p∈(0,3+222(1-δ2k)]. This not only extends some discussions of only the noiseless recovery (Lai et al. and Wu et al.) to the noise recovery, but also greatly improves the best existing results where p∈(0,\1, 1.0873(1-δ2k) \) (Wu et al.).