Congruences involving product of intervals and sets with small multiplicative doubling modulo a prime and applications

Abstract

In the present paper we obtain new upper bound estimates for the number of solutions of the congruence x y r p; x,y∈ N, x,y H, r∈, for certain ranges of H and ||, where is a subset of the field of residue classes modulo p having small multiplicative doubling. We then use this estimate to show that the number of solutions of the congruence xn λ p; x∈ , L<x<L+p/n, is at most p13-c uniformly over positive integers n, λ and L, for some absolute constant c>0. This implies, in particular, that if f(x)∈ [x] is a fixed polynomial without multiple roots in , then the congruence xf(x) 1 p, \,x∈ N, \,x p, has at most p13-c solutions as p∞, improving some recent results of Kurlberg, Luca and Shparlinski and of Balog, Broughan and Shparlinski. We use our results to show that almost all the residue classes modulo p can be represented in the form xgy p with positive integers x<p5/8+ and y<p3/8. Here g denotes a primitive root modulo p. We also prove that almost all the residue classes modulo p can be represented in the form xyzgt p with positive integers x,y,z,t<p1/4+.