A remark on the Restricted Isometry Property in Orthogonal Matching Pursuit
Abstract
This paper demonstrates that if the restricted isometry constant δK+1 of the measurement matrix A satisfies δK+1 < 1K+1, then a greedy algorithm called Orthogonal Matching Pursuit (OMP) can recover every K--sparse signal x in K iterations from A. By contrast, a matrix is also constructed with the restricted isometry constant δK+1 = 1K such that OMP can not recover some K-sparse signal x in K iterations. This result positively verifies the conjecture given by Dai and Milenkovic in 2009.
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