Verifiable conditions of 1-recovery of sparse signals with sign restrictions

Abstract

We propose necessary and sufficient conditions for a sensing matrix to be "s-semigood" -- to allow for exact 1-recovery of sparse signals with at most s nonzero entries under sign restrictions on part of the entries. We express the error bounds for imperfect 1-recovery in terms of the characteristics underlying these conditions. Furthermore, we demonstrate that these characteristics, although difficult to evaluate, lead to verifiable sufficient conditions for exact sparse 1-recovery and to efficiently computable upper bounds on those s for which a given sensing matrix is s-semigood. We concentrate on the properties of proposed verifiable sufficient conditions of s-semigoodness and describe their limits of performance.