Restricted isometry property of matrices with independent columns and neighborly polytopes by random sampling

Abstract

This paper considers compressed sensing matrices and neighborliness of a centrally symmetric convex polytope generated by vectors X1,..., XN∈n, (N n). We introduce a class of random sampling matrices and show that they satisfy a restricted isometry property (RIP) with overwhelming probability. In particular, we prove that matrices with i.i.d. centered and variance 1 entries that satisfy uniformly a sub-exponential tail inequality possess this property RIP with overwhelming probability. We show that such "sensing" matrices are valid for the exact reconstruction process of m-sparse vectors via 1 minimization with m Cn/2 (cN/n). The class of sampling matrices we study includes the case of matrices with columns that are independent isotropic vectors with log-concave densities. We deduce that if K⊂ n is a convex body and X1,..., XN∈ K are i.i.d. random vectors uniformly distributed on K, then, with overwhelming probability, the symmetric convex hull of these points is an m-centrally-neighborly polytope with m n/2 (cN/n).