A remark on Petersen coloring conjecture of Jaeger

Abstract

If G and H are two cubic graphs, then we write H G, if G admits a proper edge-coloring f with edges of H, such that for each vertex x of G, there is a vertex y of H with f(∂G(x))=∂H(y). Let P and S be the Petersen graph and the Sylvester graph, respectively. In this paper, we introduce the Sylvester coloring conjecture. Moreover, we show that if G is a connected bridgeless cubic graph with G P, then G=P. Finally, if G is a connected cubic graph with G S, then G=S.