Number of integers represented by families of binary forms II: binomial forms

Abstract

We consider some families of binary binomial forms aXd+bYd, with a and b integers. Under suitable assumptions, we prove that every rational integer m with |m| 2 is only represented by a finite number of the forms of this family (with varying d,a,b). Furthermore the number of such forms of degree d0 representing m is bounded by O(|m|(1/d0)+ε) uniformly for m ≥ 2. We also prove that the integers in the interval [-N,N] represented by one of the form of the family with degree d≥ d0 are almost all represented by some form of the family with degree d=d0. In a previous paper we investigated the particular case where the binary binomial forms are positive definite. We now treat the general case by using a lower bound for linear forms of logarithms.