Multiplicative independence in the sequence of k-generalized Pell numbers

Abstract

We study multiplicative dependence between terms of the k-generalized Pell sequence (Pn(k))n 2-k, defined by the linear recurrence \[ Pn(k) = 2Pn-1(k) + Pn-2(k) + … + Pn-k(k), \] with initial conditions P0(k) = … = P-(k-2)(k) = 0 and P1(k) = 1. For k 2 we determine all pairs (m,n) with n>m 0 such that Pn(k) and Pm(k) are multiplicatively dependent. The main result states that the only solutions occur for very small k,m,n (which are listed explicitly). The proof uses lower bounds for linear forms in logarithms (Matveev), the Baker-Davenport reduction algorithm, and a computational search.