English

Permutations that Destroy Arithmetic Progressions in Elementary $p$-Groups

Number Theory 2017-01-17 v3 Combinatorics Group Theory

Abstract

Given an abelian group GG, it is natural to ask whether there exists a permutation π\pi of GG that "destroys" all nontrivial 3-term arithmetic progressions (APs), in the sense that π(b)π(a)π(c)π(b)\pi(b) - \pi(a) \neq \pi(c) - \pi(b) for every ordered triple (a,b,c)G3(a,b,c) \in G^3 satisfying ba=cb0b-a = c-b \neq 0. This question was resolved for infinite groups GG by Hegarty, who showed that there exists an AP-destroying permutation of GG if and only if G/Ω2(G)G/\Omega_2(G) has the same cardinality as GG, where Ω2(G)\Omega_2(G) denotes the subgroup of all elements in GG whose order divides 22. In the case when GG is finite, however, only partial results have been obtained thus far. Hegarty has conjectured that an AP-destroying permutation of GG exists if G=Z/nZG = \mathbb{Z}/n\mathbb{Z} for all n2,3,5,7n \neq 2,3,5,7, and together with Martinsson, he has proven the conjecture for all n>1.4×1014n > 1.4 \times 10^{14}. In this paper, we show that if pp is a prime and kk is a positive integer, then there is an AP-destroying permutation of the elementary pp-group (Z/pZ)k(\mathbb{Z}/p\mathbb{Z})^k if and only if pp is odd and (p,k)∉{(3,1),(5,1),(7,1)}(p,k) \not\in \{(3,1),(5,1), (7,1)\}.

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

R2 v1 2026-06-22T12:38:06.696Z