中文

Lucas sequences whose nth term is a square or an almost square

数论 2007-05-23 v1

摘要

(Below, \Box means "perfect square") Let PP and QQ be non-zero integers. The Lucas sequence {Un(P,Q)}\{U_n(P,Q)\} is defined by U0=0U_0=0, U1=1U_1=1, Un=PUn1QUn2U_n=P U_{n-1}-Q U_{n-2}, (n2)(n \geq 2). Historically, there has been much interest in when the terms of such sequences are perfect squares (or higher powers). Here, we summarize results on this problem, and investigate for fixed kk solutions of Un(P,Q)=kU_n(P,Q)= k\Box, (P,Q)=1(P,Q)=1. We show finiteness of the number of solutions, and under certain hypotheses on nn, describe explicit methods for finding solutions. These involve solving finitely many Thue-Mahler equations. As an illustration of the methods, we find all solutions to Un(P,Q)=kU_n(P,Q)=k\Box where k=±1,±2k=\pm1,\pm2, and nn is a power of 2.

关键词

引用

@article{arxiv.math/0701252,
  title  = {Lucas sequences whose nth term is a square or an almost square},
  author = {A. Bremner N. Tzanakis},
  journal= {arXiv preprint arXiv:math/0701252},
  year   = {2007}
}

备注

24 pages (double spaced). To appear in Acta Arithmetica