English

Generalized Cullen Numbers in Linear Recurrence Sequences

Number Theory 2018-06-26 v1

Abstract

A Cullen number is a number of the form m2m+1m2^m+1, where mm is a positive integer. In 2004, Luca and St\u anic\u a proved, among other things, that the largest Fibonacci number in the Cullen sequence is F4=3F_4=3. Actually, they searched for generalized Cullen numbers among some binary recurrence sequences. In this paper, we will work on higher order recurrence sequences. For a given linear recurrence (Gn)n(G_n)_n, under weak assumptions, and a given polynomial T(x)Z[x]T(x)\in \mathbb{Z}[x], we shall prove that if Gn=mxm+T(x)G_n=mx^m+T(x), then mloglogxlog2(loglogx) \mboxand nlogxloglogxlog2(loglogx), m\ll\log \log |x|\log^2(\log \log |x|)\ \mbox{and}\ n\ll\log |x|\log\log |x|\log^2(\log \log |x|), where the implied constant depends only on (Gn)n(G_n)_n and T(x)T(x).

Keywords

Cite

@article{arxiv.1806.09441,
  title  = {Generalized Cullen Numbers in Linear Recurrence Sequences},
  author = {Yuri Bilu and Diego Marques and Alain Togb\' e},
  journal= {arXiv preprint arXiv:1806.09441},
  year   = {2018}
}
R2 v1 2026-06-23T02:40:37.965Z