Hamiltonian cycles passing through matchings in k-ary n-cubes
Abstract
As we all know, the k-ary n-cube is a highly efficient interconnect network topology structure. It is also a concept of great significance, with a broad range of applications spanning both mathematics and computer science. In this paper, we study the existence of Hamiltonian cycles passing through prescribed matchings in k-ary n-cubes, and obtain the following result. For n≥5 and k≥4, every matching with at most 4n-20 edges is contained in a Hamiltonian cycle in the k-ary n-cube.
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