Perturbed lattice crosses and Heisenberg uniqueness pairs

Abstract

This work focuses on two questions raised by H. Hedenmalm and A. Montes-Rodr\'iguez on Heisenberg Uniqueness Pairs for perturbed lattice crosses. The first of them deals with a complete characterization of β>0 for which, for a fixed θ ∈ R, the translated lattice cross βθ = ((Z + \θ\) × \0\) (\0\ × β Z) satisfies that (,βθ) is a Heisenberg Uniqueness Pair, where is the hyperbola in R2 with axes as asymptotes. We show that (,βθ) is a Heisenberg Uniqueness Pair if and only if β 1, confirming a prediction made by Hedenmalm and Montes-Rodr\'iguez. Furthermore, under modified decay conditions on the measures under consideration, we are able to prove sharp results for when a perturbed lattice cross A,B is such that (, A,B) is a Heisenberg Uniqueness Pair. In particular, under such decay conditions, this solves another question posed by Hedenmalm and Montes-Rodr\'iguez. Our techniques run through the analysis of the action of the operator that maps the Fourier transform of an L1 function to the Fourier transform of t-2 (1/t). In other words, we analyze the operator taking the restriction to the x-axis of a solution u to the Klein-Gordon equation to its restriction to the y-axis. This operator turns out to be related to the action of the four-dimensional Fourier transform on radial functions, which enables us to use the framework and techniques of discrete uncertainty principles for the Fourier transform.

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