Small-Support Uncertainty Principles on Z/p over Finite Fields
Abstract
We establish an uncertainty principle for functions f: Z/p → Fq with constant support (where p q-1). In particular, we show that for any constant S > 0, functions f: Z/p → Fq for which |supp\; f| = S must satisfy |supp\; f| = (1 - o(1))p. The proof relies on an application of Szemeredi's theorem; the celebrated improvements by Gowers translate into slightly stronger statements permitting conclusions for functions possessing slowly growing support as a function of p.
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