The analogue of B\"uchi's problem for function fields
Abstract
B\"uchi's Squares Problem asks for an integer such that any sequence , whose second difference of squares is the constant sequence (i.e. for all ), satisfies for some integer . Hensley's problem for -th powers (where is an integer ) is a generalization of B\"{u}chi's problem asking for an integer such that, given integers and , the quantity cannot be an -th power for or more values of the integer , unless . The analogues of these problems for rings of functions consider only sequences with at least one non-constant term. Let be a function field of a curve of genus . We prove that Hensley's problem for -th powers has a positive answer for any if has characteristic zero, improving results by Pasten and Vojta. In positive characteristic we obtain a weaker result, but which is enough to prove that B\"uchi's problem has a positive answer if (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}
}
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23 pages