Hamiltonian cycles of balanced hypercube with more faulty edges

Abstract

The balanced hypercube BHn, a variant of the hypercube, is a novel interconnection network for massive parallel systems. It is known that the balanced hypercube remains Hamiltonian after deleting at most 4n-5 faulty edges if each vertex is incident with at least two edges in the resulting graph for all n≥2. In this paper, we show that there exists a fault-free Hamiltonian cycle in BHn for n 2 with | F | 5n-7 if the degree of every vertex in BHn-F is at least two and there exists no f4-cycles in BHn-F, which improves some known results.