The g-good neighbour diagnosability of hierarchical cubic networks

Abstract

Let G=(V, E) be a connected graph, a subset S⊂eq V(G) is called an Rg-vertex-cut of G if G-F is disconnected and any vertex in G-F has at least g neighbours in G-F. The Rg-vertex-connectivity is the size of the minimum Rg-vertex-cut and denoted by g(G). Many large-scale multiprocessor or multi-computer systems take interconnection networks as underlying topologies. Fault diagnosis is especially important to identify fault tolerability of such systems. The g-good-neighbor diagnosability such that every fault-free node has at least g fault-free neighbors is a novel measure of diagnosability. In this paper, we show that the g-good-neighbor diagnosability of the hierarchical cubic networks HCNn under the PMC model for 1≤ g≤ n-1 and the MM* model for 1≤ g≤ n-1 is 2g(n+2-g)-1, respectively.