Perfect powers in products of terms of elliptic divisibility sequences

Abstract

Diophantine problems involving recurrence sequences have a long history and is an actively studied topic within number theory. In this paper, we connect to the field by considering the equation align* BmBm+d… Bm+(k-1)d=y align* in positive integers m,d,k,y with (m,d)=1 and k≥ 2, where ≥ 2 is a fixed integer and B=(Bn)n=1∞ is an elliptic divisibility sequence, an important class of non-linear recurrences. We prove that the above equation admits only finitely many solutions. In fact, we present an algorithm to find all possible solutions, provided that the set of -th powers in B is given. (Note that this set is known to be finite.) We illustrate our method by an example.