A Upper Bound for the Number of Solutions of Ternary Purely Exponential Diophantine Equations

Abstract

Let a,b,c be fixed coprime positive integers with \a,b,c\>1. In this paper, combining the Gel'fond-Baker method with an elementary approach, we prove that if \a,b,c\>5× 1027, then the equation ax+by=cz has at most three positive integer solutions (x,y,z).