On reducible partition of graphs and its application to Hadwiger conjecture

Abstract

An undirected graph H is called a minor of the graph G if H can be formed from G by deleting edges and vertices and by contracting edges. If G does not have a graph H as a minor, then we say that G is H-free. Hadwiger conjecture claim that the chromatic number of G may be closely related to whether it contains Kn+1 minors. To study the coloring of a Kn+1-free G, we propose a new concept of reducible partition of vertex set VG of G. A reducible partition(RP) of a graph G with Kn minors and without Kn+1 minors is defined as a two-tuples \S1 ⊂eq VG,S2⊂eq VG\ which satisfy the following condisions:\\ (1) S1 S2 = VG, S1 S2 = \\ (2) S2 is dominated by S1, \\ (3) the induced subgraph G[S1] is a forest,\\ (4) the induced subgraph G[S2] is Kn-free.\\ Further, one can obtain a special reducible partition(SRP) \S1,S2\ of VG, which satisf the following condisions:\\ (1) S1 S2 = VG, S1 S2 = \\ (2) S1 is an independent set,\\ (4) the induced subgraph G[S2] is Kn-free.\\ We will show that both SRP and RP are always exist for any graph. With the SRP of a Kn+1-free graph G, one can obtain some usefull conclusion on the coloring of G.