On g-Extra Connectivity of Hypercube-like Networks

Abstract

Given a connected graph G and a non-negative integer g, the g-extra connectivity g(G) of G is the minimum cardinality of a set of vertices in G, if it exists, whose deletion disconnects G and leaves each remaining component with more than g vertices. This paper focuses on the g-extra connectivity of hypercube-like networks (HL-networks for short) which includes numerous well-known topologies, such as hypercubes, twisted cubes, crossed cubes and M\"obius cubes. All the known results suggest the equality g(Xn)=fn(g) holds, where Xn is an n-dimensional HL-network, fn(g)=n(g+1)-g(g+3)2, n≥ 5 and 0≤ g≤ n-3? Some authors also attempted to prove this equality in general. In this paper, we construct a subfamily of an n-dimensional HL-network with g-extra connectivity greater than fn(g) which implies that the above equality does not hold in general. We also prove that for n≥ 5 and 0≤ g≤ n-3, g(Xn)≥ fn(g) always holds. This enables us to give a sufficient condition for the equality g(Xn)=fn(g), which is then used to determine the g-extra connectivity of HL-networks for some small g or the g-extra connectivity of some particular subfamily of HL-networks. As a result, a short proof for the main results in [Journal of Computer and System Sciences 79 (2013) 669--688].