Cycle lengths modulo $k$ in expanders
Combinatorics
2022-04-21 v1
Abstract
Given a constant , an -vertex graph is called an -expander if every set of at most vertices in has an external neighborhood of size at least . Addressing a question posed by Friedman and Krivelevich in [Combinatorica, 41(1), (2021), pp. 53--74], we prove the following result: Let be an integer with smallest prime divisor . Then for every sufficiently large -expanding graph contains cycles of length congruent to any given residue modulo . This result is almost best possible, in the following sense: There exists an absolute constant such that for every integer with smallest prime divisor and for every positive , there exist arbitrarily large -expanding graphs with no cycles of length modulo , for some .
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