The Restricted Isometry Property of Subsampled Fourier Matrices
Abstract
A matrix A ∈ Cq × N satisfies the restricted isometry property of order k with constant if it preserves the 2 norm of all k-sparse vectors up to a factor of 1 . We prove that a matrix A obtained by randomly sampling q = O(k · 2 k · N) rows from an N × N Fourier matrix satisfies the restricted isometry property of order k with a fixed with high probability. This improves on Rudelson and Vershynin (Comm. Pure Appl. Math., 2008), its subsequent improvements, and Bourgain (GAFA Seminar Notes, 2014).
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