Dean's conjecture and cycles modulo k

Abstract

Dean conjectured three decades ago that every graph with minimum degree at least k 3 contains a cycle whose length is divisible by k. While the conjecture has been verified for k∈ \3,4\, it remains open for k 5. A weaker version, also proposed by Dean, asserting that every k-connected graph contains a cycle of length divisible by k, was resolved by Gao, Huo, Liu, and Ma using the notion of admissible cycles. In this paper, we resolve Dean's conjecture for all k 6. In fact, we prove a stronger result by showing that every graph with minimum degree at least k contains cycles of length r k for every even integer r, unless every end-block belongs to a specific family of exceptional graphs, which fail only to contain cycles of length 2 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.