A Sharp Restricted Isometry Constant Bound of Orthogonal Matching Pursuit
Abstract
We shall show that if the restricted isometry constant (RIC) δs+1(A) of the measurement matrix A satisfies δs+1(A) < 1s + 1, then the greedy algorithm Orthogonal Matching Pursuit(OMP) will succeed. That is, OMP can recover every s-sparse signal x in s iterations from b = Ax. Moreover, we shall show the upper bound of RIC is sharp in the following sense. For any given s ∈ , we shall construct a matrix A with the RIC δs+1(A) = 1s + 1 such that OMP may not recover some s-sparse signal x in s iterations.
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