On the Multigraph Overfull Conjecture

Abstract

A subgraph H of a multigraph G is overfull if |E(H) | > (G) |V(H)|/2 . Analogous to the Overfull Conjecture proposed by Chetwynd and Hilton in 1986, Stiebitz et al. in 2012 formed the multigraph version of the conjecture as follows: Let G be a multigraph with maximum multiplicity r and maximum degree >13 r|V(G)|. Then G has chromatic index (G) if and only if G contains no overfull subgraph. In this paper, we prove the following three results toward the Multigraph Overfull Conjecture for sufficiently large and even n. (1) If G is k-regular with k r(n/2+18), then G has a 1-factorization. This result also settles a conjecture of the first author and Tipnis from 2001 up to a constant error in the lower bound of k. (2) If G contains an overfull subgraph and δ(G) r(n/2+18), then '(G)= 'f(G) , where 'f(G) is the fractional chromatic index of G. (3) If the minimum degree of G is at least (1+)rn/2 for any 0<<1 and G contains no overfull subgraph, then '(G)=(G). The proof is based on the decomposition of multigraphs into simple graphs and we prove a slightly weak version of a conjecture due to the first author and Tipnis from 1991 on decomposing a multigraph into constrained simple graphs. The result is of independent interests.