The generalized Pillai equation r ax s by = c

Abstract

In this paper we consider N, the number of solutions (x,y,u,v) to the equation (-1)u r ax + (-1)v s by = c in nonnegative integers x, y and integers u, v ∈ \0,1\, for given integers a>1, b>1, c>0, r>0 and s>0. We show that N 2 when (ra, sb) =1 and (x,y)>0, except for a finite number of cases that can be found in a finite number of steps. For arbitrary (ra, sb) and (x,y) 0, we show that when (u,v) = (0,1) we have N 3, with an infinite number of cases for which N=3.