Decoupling of Fourier Reconstruction System for Shifts of Several Signals

Abstract

We consider the problem of ``algebraic reconstruction'' of linear combinations of shifts of several signals f1,…,fk from the Fourier samples. For each r=1,…,k we choose sampling set Sr to be a subset of the common set of zeroes of the Fourier transforms F(f), \ r, on which F(fr) 0. We show that in this way the reconstruction system is reduced to k separate systems, each including only one of the signals fr. Each of the resulting systems is of a ``generalized Prony'' form. We discuss the problem of unique solvability of such systems, and provide some examples.