The star-structure connectivity and star-substructure connectivity of hypercubes and folded hypercubes

Abstract

As a generalization of vertex connectivity, for connected graphs G and T, the T-structure connectivity (G, T) (resp. T-substructure connectivity s(G, T)) of G is the minimum cardinality of a set of subgraphs F of G that each is isomorphic to T (resp. to a connected subgraph of T) so that G-F is disconnected. For n-dimensional hypercube Qn, Lin et al. [6] showed (Qn,K1,1)=s(Qn,K1,1)=n-1 and (Qn,K1,r)=s(Qn,K1,r)=n2 for 2≤ r≤ 3 and n≥ 3. Sabir et al. [11] obtained that (Qn,K1,4)=s(Qn,K1,4)=n2 for n≥ 6, and for n-dimensional folded hypercube FQn, (FQn,K1,1)=s(FQn,K1,1)=n, (FQn,K1,r)=s(FQn,K1,r)=n+12 with 2≤ r≤ 3 and n≥ 7. They proposed an open problem of determining K1,r-structure connectivity of Qn and FQn for general r. In this paper, we obtain that for each integer r≥ 2, (Qn;K1,r)=s(Qn;K1,r)=n2 and (FQn;K1,r)=s(FQn;K1,r)= n+12 for all integers n larger than r in quare scale. For 4≤ r≤ 6, we separately confirm the above result holds for Qn in the remaining cases.