Arithmetic progressions and holomorphic phase retrieval

Abstract

We study the determination of a holomorphic function from its absolute value. Given a parameter θ ∈ R, we derive the following characterization of uniqueness in terms of rigidity of a set ⊂eq R: if F is a vector space of entire functions containing all exponentials e z, \, ∈ C \ 0 \, then every F ∈ F is uniquely determined up to a unimodular phase factor by \|F(z)| : z ∈ eiθ(R + i)\ if and only if is not contained in an arithmetic progression aZ+b. Leveraging this insight, we establish a series of consequences for Gabor phase retrieval and Pauli-type uniqueness problems. For instance, Z × Z is a uniqueness set for the Gabor phase retrieval problem in L2(R+), provided that Z is a suitable perturbation of the integers.