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Strong Menger connectivity with conditional faults on the class of hypercube-like networks. (English) Zbl 1186.68033
Summary: We study the Menger property on a class of hypercube-like networks. We show that in all \(n\)-dimensional hypercube-like networks with \(n - 2\) vertices removed, every pair of unremoved vertices \(u\) and \(v\) are connected by \(\min \{\deg (u),\deg (v)\}\) vertex-disjoint paths, where \(\deg (u)\) and \(\deg (v)\) are the remaining degree of vertices \(u\) and \(v\), respectively. Furthermore, under the restricted condition that each vertex has at least two fault-free adjacent vertices, all hypercube-like networks still have the strong Menger property, even if there are up to \(2n - 5\) vertex faults.

MSC:
68M10 Network design and communication in computer systems
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