Professor Iain Stewart i.a.stewart@durham.ac.uk
Professor
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 |
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