On Perfect Powers in k-Generalized Pell-Lucas Sequence

Published 9 Sep 2022 in math.NT | (2209.04190v1)

Abstract: Let k>=2 and let (Q_{n}^{{(k)})_{n>=2-k}} be the k-generalized Pell sequence defined by Q_{n}^{{(k)}=2Q_{n-1}^{{(k)}+Q_{n-2}^{{(k)}+...+Q_{n-k}^{(k)}}}} for n>=2 with initial conditions Q_{-(k-2)}^{{(k)}=Q_{-(k-3)}^{{(k)}=...=Q_{-1}^{(k)}=0,}} Q_{0}^{{(k)}=2,Q_{1}^{(k)}=2.} In this paper, we solve the Diophantine equation Q_{n}^{{(k)}=y^{m}} in positive integers n,m,y,k with m,y,k>=2. We show that all solutions (n,m,y) of this equation in positive integers n,m,y,k such that 2<=y<=100 are given by (n,m,y)=(3,2,4),(3,4,2) for k>=3. Namely, Q_{3}^{{(k)}=16=2^4=4²} for k>=3.