Thue inequalities with few coefficients

Abstract

Let F(x, y) be a binary form with integer coefficients, degree n≥ 3 and irreducible over the rationals. Suppose that only s + 1 of the n + 1 coefficients of F are nonzero. We show that the Thue inequality |F(x,y)|≤ m has sm2/n solutions provided that the absolute value of the discriminant D(F) of F is large enough. We also give a new upper bound for the number of solutions of |F(x,y)|≤ m, with no restriction on the discriminant of F that depends mainly on s and m, and slightly on n. Our bound becomes independent of m when m<|D(F)|2/(5(n-1)), and also independent of n if |D(F)| is large enough.