A discrete Hardy uncertainty principle

Abstract

We show that knowing the decay of a function f on a discrete set ⊂R and the decay of its Fourier transform f on a discrete set M⊂R is enough to determine the global decay of f and f, provided that (,M) is a supercritical pair in the sense of Kulikov, Nazarov, and Sodin. This decay transfer result leads to a discrete generalization of Morgan's uncertainty principle: it is enough to require |f(λ)| e-2pAπ|λ|p for all λ∈ and |f(μ)| e-2qAπ|μ|q for all μ∈ M, where (p,q) are H\"older conjugates, A>|(rπ2)|1r, and r:=\p,q\. For A=1 and p,q=2, we also show that any such function must be a scaled Gaussian. This yields a discrete version of Hardy's uncertainty principle and resolves two questions posed by Ramos and Sousa.