On asymptotic formulae in some sum-product questions

Abstract

In this paper we obtain a series of asymptotic formulae in the sum--product phenomena over the prime field Fp. In the proofs we use usual incidence theorems in Fp, as well as the growth result in SL2 (Fp) due to Helfgott. Here some of our applications: ~ a new bound for the number of the solutions to the equation (a1-a2) (a3-a4) = (a'1-a'2) (a'3-a'4), \,ai, a'i∈ A, A is an arbitrary subset of Fp, ~ a new effective bound for multilinear exponential sums of Bourgain, ~ an asymptotic analogue of the Balog--Wooley decomposition theorem, ~ growth of p1(b) + 1/(a+p2 (b)), where a,b runs over two subsets of Fp, p1,p2 ∈ Fp [x] are two non--constant polynomials, ~ new bounds for some exponential sums with multiplicative and additive characters.