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Wisztová, Elena
On a Hamiltonian cycle of the fourth power of a connected graph. (English). Mathematica Bohemica, vol. 116 (1991), issue 4, pp. 385-390
MSC: 05C38, 05C45, 05C75 | MR 1146396 | Zbl 0752.05039 | DOI: 10.21136/MB.1991.126033
Keywords:
Hamiltonian cycle; power of connected graph; matching; powers of graphs; matching in graphs
Summary:
In this paper the following theorem is proved: Let $G$ be a connected graph of order $p\geq 4$ and let $M$ be a matching in $G$. Then there exists a hamiltonian cycle $C$ of $G^4$ such that $E(C)\bigcap M=0$.
References:
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[3] L. Nebeský: On the existence of a 3-factor in the fourth power of a graph. Čas. pěst. mat. 105 (1980), 204-207. MR 0573113
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[6] J. Sedláček: Introduction into the Graph Theory. (Czech). Academia nakl. ČSAV, Praha 1981.
[7] E. Wisztová: A hamiltonian cycle and a 1-factor in the fourth power of a graph. Čas. pěst. mat. 110 (1985), 403-412. MR 0820332
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