Star Structure Connectivity of Folded hypercubes and Augmented cubes

Abstract

The connectivity is an important parameter to evaluate the robustness of a network. As a generalization, structure connectivity and substructure connectivity of graphs were proposed. For connected graphs G and H, the H-structure connectivity (G; H) (resp. H-substructure connectivity s(G; H)) of G is the minimum cardinality of a set of subgraphs F of G that each is isomorphic to H (resp. to a connected subgraph of H) so that G-F is disconnected or the singleton. As popular variants of hypercubes, the n-dimensional folded hypercubes FQn and augmented cubes AQn are attractive interconnected network prototypes for multiple processor systems. In this paper, we obtain that (FQn;K1,m)=s(FQn;K1,m)=n+12 for 2≤slant m≤slant n-1, n≥slant 7, and (AQn;K1,m)=s(AQn;K1,m)=n-12 for 4≤slant m≤slant 3n-154.