On large F-Diophantine sets

Abstract

Let F∈Z[x,y] and m2 be an integer. A set A⊂ Z is called an (F,m)-Diophantine set if F(a,b) is a perfect m-power for any a,b∈ A where a b. If F is a bivariate polynomial for which there exist infinite (F,m)-Diophantine sets, then there is a complete qualitative characterization of all such polynomials F. Otherwise, various finiteness results are known. We prove that given a finite set of distinct integers S of size n, there are infinitely many bivariate polynomials F such that S is an (F,2)-Diophantine set. In addition, we show that the degree of F can be as small as 4 n/3.