English

Arithmetic subsequences in a random ordering of an additive set

Combinatorics 2021-09-30 v3 Number Theory Probability

Abstract

For a finite set AA of size nn, an ordering is an injection from {1,2,,n}\{1,2,\ldots,n\} to AA. We present results concerning the asymptotic properties of the length LnL_n of the longest arithmetic subsequence in a random ordering of an additive set AA. In the torsion-free case where A=[1,n]dZdA = [1,n]^d\subseteq {\bf Z}^d, we prove that Ln2dlogn/loglognL_n\sim 2d\log n/\log\log n. We show that the case A=Z/nZA = {\bf Z}/n{\bf Z} behaves asymptotically like the torsion-free case with d=1d=1, and then use this fact to compute the expected length of the longest arithmetic subsequence in a random ordering of an arbitrary finite abelian group. We also prove that the number of orderings of Z/nZ{\bf Z}/n{\bf Z} without any arithmetic subsequence of length 33 is 2n12^{n-1} when n2n\geq 2 is a power of 22, and zero otherwise. We conclude with a concrete application to elementary pp-groups and a discussion of possible noncommutative generalisations.

Keywords

Cite

@article{arxiv.2012.12339,
  title  = {Arithmetic subsequences in a random ordering of an additive set},
  author = {Marcel K. Goh and Rosie Y. Zhao},
  journal= {arXiv preprint arXiv:2012.12339},
  year   = {2021}
}

Comments

15 pages, 2 tables. Various edits to match journal version

R2 v1 2026-06-23T21:14:39.582Z