An application of the BHV theorem to a new conjecture on exponential diophantine equations

Abstract

Let A, B be fixed positive integers such that \A,B\ > 1, (A,B) = 1 and AB 0 2, and let n be a positive integer with n>1. In this paper, using a deep result on the existence of primitive divisors of Lucas numbers due to Y. Bilu, G. Hanrot and P. M. Voutier BHV, we prove that if A > 8 B3, then the equation (*) (A2 n)x + (B2 n)y = ((A2 + B2)n)z has no positive integer solutions (x,y,z) with x > z > y. Combining the above conclusion with some existing results, we can deduce that if A >8 B3 and B 2 4, then (*) has only the positive integer solution (x,y,z) = (1,1,1).