Fault-tolerance of balanced hypercubes with faulty vertices and faulty edges

Abstract

Let Fv (resp. Fe) be the set of faulty vertices (resp. faulty edges) in the n-dimensional balanced hypercube BHn. Fault-tolerant Hamiltonian laceability in BHn with at most 2n-2 faulty edges is obtained in [Inform. Sci. 300 (2015) 20--27]. The existence of edge-Hamiltonian cycles in BHn-Fe for |Fe|≤ 2n-2 are gotten in [Appl. Math. Comput. 244 (2014) 447--456]. Up to now, almost all results about fault-tolerance in BHn with only faulty vertices or only faulty edges. In this paper, we consider fault-tolerant cycle embedding of BHn with both faulty vertices and faulty edges, and prove that there exists a fault-free cycle of length 22n-2|Fv| in BHn with |Fv|+|Fe|≤ 2n-2 and |Fv|≤ n-1 for n≥ 2. Since BHn is a bipartite graph with two partite sets of equal size, the cycle of a length 22n-2|Fv| is the longest in the worst-case.