Uncertainty in finite planes

Abstract

We establish a number of uncertainty inequalities for the additive group of a finite affine plane, showing that for p prime, a nonzero function f Fp2 C and its Fourier transform f Fp2 C cannot have small supports simultaneously. The "baseline" of our investigation is the well-known Meshulam's bound, which we sharpen, for the particular groups under consideration, taking into account not only the sizes of the support sets supp\,f and supp\, f, but also their structure. Our results imply in particular that, with some explicitly classified exceptions, one has |supp\,f||supp\, f|3p(p-2); in comparison, the classical uncertainty inequality gives |supp\,f||supp\, f| p2.