The super (resp., edge-) connectivity of a connected graph is the minimum cardinality of a vertex-cut (resp., an edge-cut) whose removal does not isolate a vertex. In this paper, we consider the two parameters for a special class of graphs \(G(G_p,G_1; M)\), proposed by Chen et al [Applied Math. and Computation, \(140 (2003), 245-254]\), obtained from two \(k\)-regular \(k\)-connected graphs \(G_p\) and \(G_1\), with the same order by adding a perfect matching between their vertices. Our results improve ones of Chen et al. As applications, the super connectivity and the super edge-connectivity of the \(n\)-dimensional hypercube, twisted cube, cross cube, Möbius cube and locally twisted cube are all \(2n – 2\).
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