The phase retrieval problem for solutions of the Helmholtz equation
Abstract
In this paper we consider the phase retrieval problem for Herglotz functions, that is, solutions of the Helmholtz equation u+λ2u=0 on domains ⊂Rd, d≥2. In dimension d=2, if u,v are two such solutions then |u|=|v| implies that either u=cv or u=c v for some c∈C with |c|=1. In dimension d≥3, the same conclusion holds under some restriction on u and v: either they are real valued or zonal functions or have non vanishing mean.
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