Star graphs are Cayley graphs of symmetric groups of permutations, with transpositions as the generating sets. A star graph is a preferred interconnection network topology to a hypercube for its ability to connect a greater number of nodes with lower degree. However, an attractive property of the hypercube is that it has a Hamiltonian decomposition, i.e. its edges can be partitioned into disjoint Hamiltonian cycles, and therefore a simple routing can be found in the case of an edge failure. The existence of Hamiltonian cycles in Cayley graphs has been known for some time. So far, there are no published results on the much stronger condition of the existence of Hamiltonian decompositions. In this paper, we give a construction of a Hamiltonia...
AbstractLet G be a group generated by X. A Cayley graph over G is defined as a graph G(X) whose vert...
AbstractCayley graphs arise naturally in computer science, in the study of word-hyperbolic groups an...
A Hamiltonian graph G = (V,E) is called hyper-Hamiltonian if G-v is Hamiltonian for any v ∈ V(G). G ...
The search for edge-disjoint Hamilton cycles in star graphs is important for the design of interconn...
AbstractWe prove that any 4-regular connected Cayley graph on a finite abelian group can be decompos...
A Hamilton cycle is a cycle which passes through every vertex of a graph. A Hamilton cycle decomposi...
Let H be a graph. A decomposition of H is a set of edge-disjoint subgraphs of H whose union is H. A ...
In interconnection network topologies, the n-dimensional star graph Stn has n! vertices correspondin...
AbstractIt is well known that K2n + 1 can be decomposed into n edge-disjoint Hamilton cycles. A nove...
AbstractA bipartite graph is Hamiltonian laceable if there exists a Hamiltonian path joining every p...
Most network topologies that have been studied have been subgraphs of transposition graphs. Edge-dis...
Abstract—The arrangement graph An,k, which is a generalization of the star graph (n- k = 1), present...
AbstractChen (1988) conjectured that every finite hamiltonian Cayley graph is edge-hamiltonian. We p...
International audienceThe Cayley graphs on the symmetric group plays an important role in the study ...
AbstractIn this paper we give a procedure by which Hamiltonian decompositions of the s-partite graph...
AbstractLet G be a group generated by X. A Cayley graph over G is defined as a graph G(X) whose vert...
AbstractCayley graphs arise naturally in computer science, in the study of word-hyperbolic groups an...
A Hamiltonian graph G = (V,E) is called hyper-Hamiltonian if G-v is Hamiltonian for any v ∈ V(G). G ...
The search for edge-disjoint Hamilton cycles in star graphs is important for the design of interconn...
AbstractWe prove that any 4-regular connected Cayley graph on a finite abelian group can be decompos...
A Hamilton cycle is a cycle which passes through every vertex of a graph. A Hamilton cycle decomposi...
Let H be a graph. A decomposition of H is a set of edge-disjoint subgraphs of H whose union is H. A ...
In interconnection network topologies, the n-dimensional star graph Stn has n! vertices correspondin...
AbstractIt is well known that K2n + 1 can be decomposed into n edge-disjoint Hamilton cycles. A nove...
AbstractA bipartite graph is Hamiltonian laceable if there exists a Hamiltonian path joining every p...
Most network topologies that have been studied have been subgraphs of transposition graphs. Edge-dis...
Abstract—The arrangement graph An,k, which is a generalization of the star graph (n- k = 1), present...
AbstractChen (1988) conjectured that every finite hamiltonian Cayley graph is edge-hamiltonian. We p...
International audienceThe Cayley graphs on the symmetric group plays an important role in the study ...
AbstractIn this paper we give a procedure by which Hamiltonian decompositions of the s-partite graph...
AbstractLet G be a group generated by X. A Cayley graph over G is defined as a graph G(X) whose vert...
AbstractCayley graphs arise naturally in computer science, in the study of word-hyperbolic groups an...
A Hamiltonian graph G = (V,E) is called hyper-Hamiltonian if G-v is Hamiltonian for any v ∈ V(G). G ...