The structure connectivity of Data Center Networks
Abstract
Last decade, numerous giant data center networks are built to provide increasingly fashionable web applications. For two integers m≥ 0 and n≥ 2, the m-dimensional DCell network with n-port switches Dm,n and n-dimensional BCDC network Bn have been proposed. Connectivity is a basic parameter to measure fault-tolerance of networks. As generalizations of connectivity, structure (substructure) connectivity was recently proposed. Let G and H be two connected graphs. Let F be a set whose elements are subgraphs of G, and every member of F is isomorphic to H (resp. a connected subgraph of H). Then H-structure connectivity (G; H) (resp. H-substructure connectivity s(G; H)) of G is the size of a smallest set of F such that the rest of G is disconnected or the singleton when removing F. Then it is meaningful to calculate the structure connectivity of data center networks on some common structures, such as star K1,t, path Pk, cycle Ck, complete graph Ks and so on. In this paper, we obtain that (Dm,n; K1,t)=s (Dm,n; K1,t)= n-11+t+m for 1≤ t≤ m+n-2 and (Dm,n; Ks)= n-1s+m for 3≤ s≤ n-1 by analyzing the structural properties of Dm,n. We also compute (Bn; H) and s(Bn; H) for H∈ \K1,t, Pk, Ck|1≤ t≤ 2n-3, 6≤ k≤ 2n-1 \ and n≥ 5 by using g-extra connectivity of Bn.
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