Point partition numbers: decomposable and indecomposable critical graphs

Abstract

Graphs considered in this paper are finite, undirected and loopless, but we allow multiple edges. The point partition number t(G) is the least integer k for which G admits a coloring with k colors such that each color class induces a (t-1)-degenerate subgraph of G. So 1 is the chromatic number and 2 is the point aboricity. The point partition number t with t≥ 1 was introduced by Lick and White. A graph G is called t-critical if every proper subgraph H of G satisfies t(H)<t(G). In this paper we prove that if G is a t-critical graph whose order satisfies |G|≤ 2t(G)-2, then G can be obtained from two non-empty disjoint subgraphs G1 and G2 by adding t edges between any pair u,v of vertices with u∈ V(G1) and v∈ V(G2). Based on this result we establish the minimum number of edges possible in a t-critical graph G of order n and with t(G)=k, provided that n≤ 2k-1 and t is even. For t=1 the corresponding two results were obtained in 1963 by Tibor Gallai.