Satisfying the Restricted Isometry Property with the Optimal Number of Rows and Slightly Less Randomness

Abstract

A matrix ∈ RQ × N satisfies the restricted isometry property if \| x\|22 is approximately equal to \|x\|22 for all k-sparse vectors x. We give a construction of RIP matrices with the optimal Q = O(k (N/k)) rows using O(k(N/k)(k)) bits of randomness. The main technical ingredient is an extension of the Hanson-Wright inequality to ε-biased distributions.

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