Component edge connectivity of the folded hypercube
Abstract
The g-component edge connectivity cλg(G) of a non-complete graph G is the minimum number of edges whose deletion results in a graph with at least g components. In this paper, we determine the component edge connectivity of the folded hypercube cλg+1(FQn)=(n+1)g-(Σi=0sti2ti-1+Σi=0s i· 2ti) for g≤ 2[n+12] and n≥ 5, where g be a positive integer and g=Σi=0s2ti be the decomposition of g such that t0=[2g], and ti=[2(g-Σr=0i-12tr)] for i≥ 1.
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