Subcritical Fourier uncertainty principles

Abstract

It is well known that if a function f satisfies \|f(x) eπ α |x|2\|p + \| f() eπ α ||2 \|q<∞ (*) with α=1 and 1 p,q<∞, then f 0. We prove that if f satisfies (*) with some 0<α<1 and 1 p,q≤ ∞, then |f(y)| C (1+|y|)dp e- π α |y|2, y∈ Rd, with C=C(α,d,p,q) and this bound is sharp for p≠ 1. We also study a related uncertainty principle for functions satisfying \;\;\|f(x)|x|m\|p+ \|f()||n\|q <∞.

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