On the chromatic edge stability index of graphs

Abstract

Given a non-trivial graph G, the minimum cardinality of a set of edges F in G such that '(G F)<'(G) is called the chromatic edge stability index of G, denoted by es'(G), and such a (smallest) set F is called a (minimum) mitigating set. While 1 es'(G) n/2 holds for any graph G, we investigate the graphs with extremal and near-extremal values of es'(G). The graphs G with es'(G)= n/2 are classified, and the graphs G with es'(G)= n/2-1 and '(G)=(G)+1 are characterized. We establish that the odd cycles and K2 are exactly the regular connected graphs with the chromatic edge stability index 1; on the other hand, we prove that it is NP-hard to verify whether a graph G has es'(G)=1. We also prove that every minimum mitigating set of an r-regular graph G, where r 4, with es'(G)=2 is a matching. Furthermore, we propose a conjecture that for every graph G there exists a minimum mitigating set, which is a matching, and prove that the conjecture holds for graphs G with es'(G)∈\1,2, n/2-1, n/2\, and for bipartite graphs.