Vulnerability of super edge-connected graphs

Abstract

A subset F of edges in a connected graph G is a h-extra edge-cut if G-F is disconnected and every component has more than h vertices. The h-extra edge-connectivity (h)(G) of G is defined as the minimum cardinality over all h-extra edge-cuts of G. A graph G, if (h)(G) exists, is super-(h) if every minimum h-extra edge-cut of G isolates at least one connected subgraph of order h+1. The persistence (h)(G) of a super-(h) graph G is the maximum integer m for which G-F is still super-(h) for any set F⊂eq E(G) with |F|≤slant m. Hong et al. [Discrete Appl. Math. 160 (2012), 579-587] showed that \(1)(G)-δ(G)-1,δ(G)-1\≤slant (0)(G)≤slant δ(G)-1, where δ(G) is the minimum vertex-degree of G. This paper shows that \(2)(G)-(G)-1,δ(G)-1\≤slant (1)(G)≤slant δ(G)-1, where (G) is the minimum edge-degree of G. In particular, for a k-regular super-' graph G, (1)(G)=k-1 if (2)(G) does not exist or G is super-(2) and triangle-free, from which the exact values of (1)(G) are determined for some well-known networks.