Congruences with intervals and arbitrary sets

Abstract

Given a prime p, an integer H∈[1,p), and an arbitrary set M⊂eq Fp*, where Fp is the finite field with p elements, let J(H, M) denote the number of solutions to the congruence xm yn p for which x,y∈[1,H] and m,n∈ M. In this paper, we bound J(H, M) in terms of p, H and the cardinality of M. In a wide range of parameters, this bound is optimal. We give two applications of this bound: to new estimates of trilinear character sums and to bilinear sums with Kloosterman sums, complementing some recent results of Kowalski, Michel and Sawin (2018).