English

Dean's conjecture and cycles modulo k

Combinatorics 2026-01-21 v1

Abstract

Dean conjectured three decades ago that every graph with minimum degree at least k3k\ge 3 contains a cycle whose length is divisible by kk. While the conjecture has been verified for k{3,4}k\in \{3,4\}, it remains open for k5k\ge 5. A weaker version, also proposed by Dean, asserting that every kk-connected graph contains a cycle of length divisible by kk, was resolved by Gao, Huo, Liu, and Ma using the notion of admissible cycles. In this paper, we resolve Dean's conjecture for all k6k\ge 6. In fact, we prove a stronger result by showing that every graph with minimum degree at least kk contains cycles of length r(modk)r \pmod k for every even integer rr, unless every end-block belongs to a specific family of exceptional graphs, which fail only to contain cycles of length 2(modk)2 \pmod k. We also establish a strengthened result on the existence of admissible cycles. Our proof introduces two sparse graph families, called trigonal graphs and tetragonal graphs, which provide a flexible framework for studying path and cycle lengths and may be of independent interest.

Keywords

Cite

@article{arxiv.2601.13552,
  title  = {Dean's conjecture and cycles modulo k},
  author = {Yufan Luo and Jie Ma and Ziyuan Zhao},
  journal= {arXiv preprint arXiv:2601.13552},
  year   = {2026}
}

Comments

29 pages, 4 figures

R2 v1 2026-07-01T09:11:45.429Z