Explicit and Mixed Estimates for Thue inequalities with few coefficients

Abstract

Let F(x,y) be an irreducible form of degree r≥ 3 and having s+1 non-zero coefficients. Let h≥ 1 be an integer and consider the Thue inequality |F(x,y)|≤ h. Following the seminal work of Thue in 1909, several papers were written giving an upper bound for the number of solutions of the above inequality as c(r,s,h) where c(r,s,h) is an explicit function of r,s and h. Invariably, the absolute constant involved in has been left undetermined. In this paper, following Bombieri, Schmidt and Mueller, we give three different upper bounds which are explicit in every aspect.