Cycle lengths in expanding graphs
Abstract
For a positive constant a graph on vertices is called an -expander if every vertex set of size at most has an external neighborhood whose size is at least . We study cycle lengths in expanding graphs. We first prove that cycle lengths in -expanders are well distributed. Specifically, we show that for every there exist positive constants , and such that for every -expander on vertices and every integer , contains a cycle whose length is between and ; the order of dependence of the additive error term on is optimal. Secondly, we show that every -expander on vertices contains different cycle lengths. Finally, we introduce another expansion-type property, guaranteeing the existence of a linearly long interval in the set of cycle lengths. For a graph on vertices is called a -graph if every pair of disjoint sets of size at least are connected by an edge. We prove that for every there exist positive constants and such that every -graph on vertices contains a cycle of length for every integer ; the order of dependence of and on is optimal.
Keywords
Cite
@article{arxiv.1912.11011,
title = {Cycle lengths in expanding graphs},
author = {Limor Friedman and Michael Krivelevich},
journal= {arXiv preprint arXiv:1912.11011},
year = {2020}
}