Chromatic index determined by fractional chromatic index

Abstract

Given a graph G possibly with multiple edges but no loops, denote by the maximum degree, μ the multiplicity, ' the chromatic index and f' the fractional chromatic index of G, respectively. It is known that f' ' + μ, where the upper bound is a classic result of Vizing. While deciding the exact value of ' is a classic NP-complete problem, the computing of f' is in polynomial time. In fact, it is shown that if f' > then f'= |E(H)| |V(H)|/2, where the maximality is over all induced subgraphs H of G. Gupta\,(1967), Goldberg\,(1973), Andersen\,(1977), and Seymour\,(1979) conjectured that '=f' if ' +2, which is commonly referred as Goldberg's conjecture. In this paper, we show that if ' >+[3]/2 then '=f'. The previous best known result is for graphs with '> +/2 obtained by Scheide, and by Chen, Yu and Zang, independently. It has been shown that Goldberg's conjecture is equivalent to the following conjecture of Jakobsen: For any positive integer m with m 3, every graph G with '>mm-1+m-3m-1 satisfies '=f'. Jakobsen's conjecture has been verified for m up to 15 by various researchers in the last four decades. We show that it is true for m 23. Moreover, we show that Goldberg's conjecture holds for graphs G with ≤ 23 or |V(G)|≤ 23.