On the -edge stability number of graphs

Abstract

The -edge stability number es(G) of a graph G is the minimum number of edges of G whose removal results in a subgraph H with (H) = (G)-1. Sets whose removal results in a subgraph with smaller maximum degree are called mitigating sets. It is proved that there always exists a mitigating set which induces a disjoint union of paths of order 2 or 3. Minimum mitigating sets which induce matchings are characterized. It is proved that to obtain an upper bound of the form es(G) ≤ c |V(G)| for an arbitrary graph G of given maximum degree , where c is a given constant, it suffices to prove the bound for -regular graphs. Sharp upper bounds of this form are derived for regular graphs. It is proved that if (G) ≥|V(G)|-23 or the induced subgraph on maximum degree vertices has a (G)-edge coloring, then es(G) |V(G)|/2.