Reconstructing real-valued functions from unsigned coefficients with respect to wavelet and other frames

Abstract

In this paper we consider the following problem of phase retrieval: Given a collection of real-valued band-limited functions \λ\λ∈ ⊂ L2(Rd) that constitutes a semi-discrete frame, we ask whether any real-valued function f ∈ L2(Rd) can be uniquely recovered from its unsigned convolutions \|f λ|\λ ∈ . We find that under some mild assumptions on the semi-discrete frame and if f has exponential decay at ∞, it suffices to know |f λ| on suitably fine lattices to uniquely determine f (up to a global sign factor). We further establish a local stability property of our reconstruction problem. Finally, for two concrete examples of a (discrete) frame of L2(Rd), d=1,2, we show that through sufficient oversampling one obtains a frame such that any real-valued function with exponential decay can be uniquely recovered from its unsigned frame coefficients.