Critical graphs for the chromatic edge-stability number

Abstract

The chromatic edge-stability number es(G) of a graph G is the minimum number of edges whose removal results in a spanning subgraph G' with (G')=(G)-1. Edge-stability critical graphs are introduced as the graphs G with the property that es(G-e) < es(G) holds for every edge e∈ E(G). If G is an edge-stability critical graph with (G)=k and es(G)=, then G is (k,)-critical. Graphs which are (3,2)-critical and contain at most four odd cycles are classified. It is also proved that the problem of deciding whether a graph G has (G)=k and is critical for the chromatic number can be reduced in polynomial time to the problem of deciding whether a graph is (k,2)-critical.