| Abstract: | The star graph interconnection network has been recognized as an attractive alternative to the hypercube for its nice topological properties. Unlike previous research concerning the issue of embedding exactly one Hamiltonian cycle into an injured star network, this paper addresses the maximum number of fault-free mutually independent Hamiltonian cycles in the faulty star network. To be precise, let SG n denote an n-dimensional star network in which f≤n?3 edges may fail accidentally. We show that there exist (n?2?f)-mutually independent Hamiltonian cycles rooted at any vertex in SG n if n∈{3, 4}, and there exist (n?1?f)-mutually independent Hamiltonian cycles rooted at any vertex in SG n if n≥5. |
