English

The analogue of B\"uchi's problem for function fields

Number Theory 2010-04-07 v1

Abstract

B\"uchi's nn Squares Problem asks for an integer MM such that any sequence (x0,...,xM1)(x_0,...,x_{M-1}), whose second difference of squares is the constant sequence (2)(2) (i.e. xn22xn12+xn22=2x^2_n-2x^2_{n-1}+x_{n-2}^2=2 for all nn), satisfies xn2=(x+n)2x_n^2=(x+n)^2 for some integer xx. Hensley's problem for rr-th powers (where rr is an integer 2\geq2) is a generalization of B\"{u}chi's problem asking for an integer MM such that, given integers ν\nu and aa, the quantity (ν+n)ra(\nu+n)^r-a cannot be an rr-th power for MM or more values of the integer nn, unless a=0a=0. The analogues of these problems for rings of functions consider only sequences with at least one non-constant term. Let KK be a function field of a curve of genus gg. We prove that Hensley's problem for rr-th powers has a positive answer for any rr if KK has characteristic zero, improving results by Pasten and Vojta. In positive characteristic pp we obtain a weaker result, but which is enough to prove that B\"uchi's problem has a positive answer if p312g+169p\geq 312g+169 (improving results by Pheidas and the second author).

Keywords

Cite

@article{arxiv.1004.0731,
  title  = {The analogue of B\"uchi's problem for function fields},
  author = {Alexandra Shlapentokh and Xavier Vidaux},
  journal= {arXiv preprint arXiv:1004.0731},
  year   = {2010}
}

Comments

23 pages

R2 v1 2026-06-21T15:06:44.678Z