English

Cycle lengths modulo $k$ in expanders

Combinatorics 2022-04-21 v1

Abstract

Given a constant α>0\alpha>0, an nn-vertex graph is called an α\alpha-expander if every set XX of at most n/2n/2 vertices in GG has an external neighborhood of size at least αX\alpha|X|. Addressing a question posed by Friedman and Krivelevich in [Combinatorica, 41(1), (2021), pp. 53--74], we prove the following result: Let k>1k>1 be an integer with smallest prime divisor pp. Then for α>1p1\alpha>\frac{1}{p-1} every sufficiently large α\alpha-expanding graph contains cycles of length congruent to any given residue modulo kk. This result is almost best possible, in the following sense: There exists an absolute constant c>0c>0 such that for every integer kk with smallest prime divisor pp and for every positive α<cp1\alpha<\frac{c}{p-1}, there exist arbitrarily large α\alpha-expanding graphs with no cycles of length rr modulo kk, for some r{0,,k1}r \in \{0,\ldots,k-1\}.

Keywords

Cite

@article{arxiv.2204.09107,
  title  = {Cycle lengths modulo $k$ in expanders},
  author = {Anders Martinsson and Raphael Steiner},
  journal= {arXiv preprint arXiv:2204.09107},
  year   = {2022}
}

Comments

11 pages, no figures

R2 v1 2026-06-24T10:52:34.451Z