Integral zeros of a polynomial with linear recurrences as coefficients

Abstract

Let K be a number field, S a finite set of places of K , and OS be the ring of S -integers. Moreover, let Gn(0) Zd + ·s + Gn(d-1) Z + Gn(d) be a polynomial in Z having simple linear recurrences of integers evaluated at n as coefficients. Assuming some technical conditions we give a description of the zeros (n,z) ∈ N × OS of the above polynomial. We also give a result in the spirit of Hilbert irreducibility for such polynomials.