Signal Recovery From Product of Two Vandermonde Matrices

Abstract

In this work, we present some new results for compressed sensing and phase retrieval. For compressed sensing, it is shown that if the unknown n-dimensional vector can be expressed as a linear combination of s unknown Vandermonde vectors (with Fourier vectors as a special case) and the measurement matrix is a Vandermonde matrix, exact recovery of the vector with 2s measurements and O(poly(s)) complexity is possible when n ≥ 2s. Based on this result, a new class of measurement matrices is presented from which it is possible to recover s-sparse n-dimensional vectors for n ≥ 2s with as few as 2s measurements and with a recovery algorithm of O(poly(s)) complexity. In the second part of the work, these results are extended to the challenging problem of phase retrieval. The most significant discovery in this direction is that if the unknown n-dimensional vector is composed of s frequencies with at least one being non-harmonic, n ≥ 4s - 1 and we take at least 8s-3 Fourier measurements, there are, remarkably, only two possible vectors producing the observed measurement values and they are easily obtainable from each other. The two vectors can be found by an algorithm with only O(poly(s)) complexity. An immediate application of the new result is construction of a measurement matrix from which it is possible to recover almost all s-sparse n-dimensional signals (up to a global phase) from O(s) magnitude-only measurements and O(poly(s)) recovery complexity when n ≥ 4s - 1.