SUPER: Sparse signals with Unknown Phases Efficiently Recovered

Abstract

Suppose x is any exactly k-sparse vector in Cn. We present a class of phase measurement matrix A in Cm× n, and a corresponding algorithm, called SUPER, that can resolve x up to a global phase from intensity measurements |A x| with high probability over A. Here |A x| is a vector of component-wise magnitudes of A x. The SUPER algorithm is the first to simultaneously have the following properties: (a) it requires only O(k) (order-optimal) measurements, (b) the computational complexity of decoding is O(k k) (near order-optimal) arithmetic operations.