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Hamiltonian cycles through prescribed edges in k-ary n-cubes.

Stewart, I.A.

Authors



Contributors

W. Wang
Editor

X. Zhu
Editor

D-Z. Du
Editor

Abstract

We prove that if P is a set of at most 2n − 1 edges in a k-ary n-cube, where k ≥ 4 and n ≥ 2, then there is a Hamiltonian cycle on which every edge of P lies if, and only if, the subgraph of the k-ary n-cube induced by the edges of P is a vertex-disjoint collection of paths. This answers a question posed by Wang, Li and Wang who proved the analogous result for 3-ary n-cubes.

Citation

Stewart, I. (2011, December). Hamiltonian cycles through prescribed edges in k-ary n-cubes. Presented at 5th Annual International Conference on Combinatorial Optimization and Applications, COCOA'11., Zhangjiajie, China

Presentation Conference Type Conference Paper (published)
Conference Name 5th Annual International Conference on Combinatorial Optimization and Applications, COCOA'11.
Publication Date 2011
Deposit Date Aug 25, 2011
Print ISSN 0302-9743
Publisher Springer Verlag
Volume 6831
Pages 82-97
Series Title Lecture Notes in Computer Science Vol. 6831
Book Title Combinatorial Optimization and Applications. COCOA 2011.
DOI https://doi.org/10.1007/978-3-642-22616-8_8
Public URL https://durham-repository.worktribe.com/output/1157712