A dynamical system approach to Heisenberg Uniqueness Pairs

Abstract

Let be a set of lines in R2 that intersect at the origin. For ⊂R2 a smooth curve, we denote by AC() the subset of finite measures on that are absolutely continuous with respect to arc length on . For such a μ, μ denotes the Fourier transform of μ. Following Hendenmalm and Montes-Rodr\'iguez, we will say that (,) is a Heisenberg Uniqueness Pair if μ∈AC() is such that μ=0 on , then μ=0. The aim of this paper is to provide new tools to establish this property. To do so, we will reformulate the fact that μ vanishes on in terms of an invariance property of μ induced by . This leads us to a dynamical system on generated by . The investigation of this dynamical system allows us to establish that (,) is a Heisenberg Uniqueness Pair. This way we both unify proofs of known cases (circle, parabola, hyperbola) and obtain many new examples. This method also allows to have a better geometric intuition on why (,) is a Heisenberg Uniqueness Pair.