Permutations that Destroy Arithmetic Progressions in Elementary $p$-Groups
Abstract
Given an abelian group , it is natural to ask whether there exists a permutation of that "destroys" all nontrivial 3-term arithmetic progressions (APs), in the sense that for every ordered triple satisfying . This question was resolved for infinite groups by Hegarty, who showed that there exists an AP-destroying permutation of if and only if has the same cardinality as , where denotes the subgroup of all elements in whose order divides . In the case when is finite, however, only partial results have been obtained thus far. Hegarty has conjectured that an AP-destroying permutation of exists if for all , and together with Martinsson, he has proven the conjecture for all . In this paper, we show that if is a prime and is a positive integer, then there is an AP-destroying permutation of the elementary -group if and only if is odd and .
Keywords
Cite
@article{arxiv.1601.07541,
title = {Permutations that Destroy Arithmetic Progressions in Elementary $p$-Groups},
author = {Noam D. Elkies and Ashvin Swaminathan},
journal= {arXiv preprint arXiv:1601.07541},
year = {2017}
}
Comments
10 pages