On the size of the set A(A+1)

Abstract

Let Fp be the field of a prime order p. For a subset A⊂ Fp we consider the product set A(A+1). This set is an image of A× A under the polynomial mapping f(x,y)=xy+x:Fp× Fp Fp. In the present paper we show that if |A|<p1/2, then |A(A+1)| |A|106/105+o(1). If |A|>p2/3, then we prove that |A(A+1)| p |A| and show that this is the optimal in general settings bound up to the implied constant. We also estimate the cardinality of A(A+1) when A is a subset of real numbers. We show that in this case one has the Elekes type bound |A(A+1)| |A|5/4.