Generalised Fermat equations in dense variables over finite fields and rings

Abstract

Let A be a sufficiently dense subset of a finite field Fq or a finite, cyclic ring Z/ N Z. Assuming that q and N have no small prime divisors, we show that generalised Fermat equations have the expected number of solutions over A. We further show that our density threshold is optimal. Our proofs involve average Fourier decay for Bohr sets, mixed character sum bounds, equidistribution of polynomial sequences, popular Cauchy--Davenport lemmas, and a regularity-type lemma due to Semchankau.

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