Extra Connectivity of Strong Product of Graphs

Abstract

The g-extra connectivity g(G) of a connected graph G is the minimum cardinality of a set of vertices, if it exists, whose deletion makes G disconnected and leaves each remaining component with more than g vertices, where g is a non-negative integer. The strong product G1 G2 of graphs G1 and G2 is the graph with vertex set V(G1 G2)=V(G1)× V(G2), where two distinct vertices (x1, y1),(x2, y2) ∈ V(G1)× V(G2) are adjacent in G1 G2 if and only if x1=x2 and y1 y2 ∈ E(G2) or y1=y2 and x1 x2 ∈ E(G1) or x1 x2 ∈ E(G1) and y1 y2 ∈ E(G2). In this paper, we give the g\ (≤ 3)-extra connectivity of G1 G2, where Gi is a maximally connected ki\ (≥ 2)-regular graph for i=1,2. As a byproduct, we get g\ (≤ 3)-extra conditional fault-diagnosability of G1 G2 under PMC model.