Perfect powers in polynomial power sums

Abstract

We prove that a non-degenerate simple linear recurrence sequence (Gn(x))n=0∞ of polynomials satisfying some further conditions cannot contain arbitrary large powers of polynomials if the order of the sequence is at least two. In other words we will show that for m large enough there is no polynomial h(x) of degree ≥ 2 such that (h(x))m is an element of (Gn(x))n=0∞ . The bound for m depends here only on the sequence (Gn(x))n=0∞ . In the binary case we prove even more. We show that then there is a bound C on the index n of the sequence (Gn(x))n=0∞ such that only elements with index n ≤ C can be a proper power.