Abstract—The arrangement graph An,k, which is a generalization of the star graph (n- k = 1), presents more flexibility than the star graph in adjusting the major design parameters: number of nodes, degree, and diameter. Previously, the arrangement graph has proved Hamiltonian. In this paper, we further show that the arrangement graph remains Hamiltonian even if it is faulty. Let ç Fe ç and ç Fv ç denote the numbers of edge faults and vertex faults, respectively. We show that An,k is Hamiltonian when 1) (k = 2 and n- k ‡ 4, o
This chapter presents the theorem of Hamiltonian cycles in regular graphs. If in a graph of order n ...
AbstractA graph G with p≥3 points, 0≤n≤p−3, is called n-Hamiltonian if the removal of any k points f...
AbstractWe prove that a k-connected graph (k⩾2) is Hamiltonian if it is not contractible to one of a...
In this paper, we investigate the star graph Sn with faulty vertices and/or edges from the graph the...
Methods are presented to embed Hamiltonian paths (H-paths) and Hamiltonian cycles (H-cycles) in a st...
In this paper, we consider the fault Hamiltonicity, and the fault Hamiltonian connectivity of the (n...
In this paper, we present three construction schemes for fault-tolerant Hamiltonian graphs. We show ...
The butterfly graphs were originally defined as the underlying graphs of FFT networks which can perf...
[[sponsorship]]資訊科學研究所,資訊科技創新研究中心[[note]]已出版;[SCI];有審查制度;具代表性[[note]]http://gateway.isiknowledge.com...
AbstractThe conditional fault model imposes a constraint on the fault distribution. For example, the...
The crossed cube is a prominent variant of the well known, highly regular-structured hypercube. In [...
In this paper, various properties of particular type of Hamiltonian graph and it’s edge-disjoint Ham...
AbstractA bipartite graph is Hamiltonian laceable if there exists a Hamiltonian path joining every p...
[[sponsorship]]資訊科學研究所,資訊科技創新研究中心[[note]]已出版;[SCI];有審查制度;具代表性[[note]]http://gateway.isiknowledge.com...
Star graphs are Cayley graphs of symmetric groups of permutations, with transpositions as the genera...
This chapter presents the theorem of Hamiltonian cycles in regular graphs. If in a graph of order n ...
AbstractA graph G with p≥3 points, 0≤n≤p−3, is called n-Hamiltonian if the removal of any k points f...
AbstractWe prove that a k-connected graph (k⩾2) is Hamiltonian if it is not contractible to one of a...
In this paper, we investigate the star graph Sn with faulty vertices and/or edges from the graph the...
Methods are presented to embed Hamiltonian paths (H-paths) and Hamiltonian cycles (H-cycles) in a st...
In this paper, we consider the fault Hamiltonicity, and the fault Hamiltonian connectivity of the (n...
In this paper, we present three construction schemes for fault-tolerant Hamiltonian graphs. We show ...
The butterfly graphs were originally defined as the underlying graphs of FFT networks which can perf...
[[sponsorship]]資訊科學研究所,資訊科技創新研究中心[[note]]已出版;[SCI];有審查制度;具代表性[[note]]http://gateway.isiknowledge.com...
AbstractThe conditional fault model imposes a constraint on the fault distribution. For example, the...
The crossed cube is a prominent variant of the well known, highly regular-structured hypercube. In [...
In this paper, various properties of particular type of Hamiltonian graph and it’s edge-disjoint Ham...
AbstractA bipartite graph is Hamiltonian laceable if there exists a Hamiltonian path joining every p...
[[sponsorship]]資訊科學研究所,資訊科技創新研究中心[[note]]已出版;[SCI];有審查制度;具代表性[[note]]http://gateway.isiknowledge.com...
Star graphs are Cayley graphs of symmetric groups of permutations, with transpositions as the genera...
This chapter presents the theorem of Hamiltonian cycles in regular graphs. If in a graph of order n ...
AbstractA graph G with p≥3 points, 0≤n≤p−3, is called n-Hamiltonian if the removal of any k points f...
AbstractWe prove that a k-connected graph (k⩾2) is Hamiltonian if it is not contractible to one of a...