Small coherence implies the weak Null Space Property

Abstract

In the Compressed Sensing community, it is well known that given a matrix X ∈ Rn× p with 2 normalized columns, the Restricted Isometry Property (RIP) implies the Null Space Property (NSP). It is also well known that a small Coherence μ implies a weak RIP, i.e. the singular values of XT lie between 1-δ and 1+δ for "most" index subsets T ⊂ \1,…,p\ with size governed by μ and δ. In this short note, we show that a small Coherence implies a weak Null Space Property, i.e. hT2 C \ hTc1/s for most T ⊂ \1,…,p\ with cardinality |T| s. We moreover prove some singular value perturbation bounds that may also prove useful for other applications.