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Title: A new approach to chordal graphs (English)
Author: Nebeský, Ladislav
Language: English
Journal: Czechoslovak Mathematical Journal
ISSN: 0011-4642 (print)
ISSN: 1572-9141 (online)
Volume: 57
Issue: 1
Year: 2007
Pages: 465-471
Summary lang: English
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Category: math
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Summary: By a chordal graph is meant a graph with no induced cycle of length $\ge 4$. By a ternary system is meant an ordered pair $(W, T)$, where $W$ is a finite nonempty set, and $T \subseteq W \times W \times W$. Ternary systems satisfying certain axioms (A1)–(A5) are studied in this paper; note that these axioms can be formulated in a language of the first-order logic. For every finite nonempty set $W$, a bijective mapping from the set of all connected chordal graphs $G$ with $V(G) = W$ onto the set of all ternary systems $(W, T)$ satisfying the axioms (A1)–(A5) is found in this paper. (English)
Keyword: connected chordal graph
Keyword: ternary system
MSC: 03C65
MSC: 05C38
MSC: 05C75
idZBL: Zbl 1174.05110
idMR: MR2309978
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Date available: 2009-09-24T11:47:06Z
Last updated: 2020-07-03
Stable URL: http://hdl.handle.net/10338.dmlcz/128184
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Reference: [1] G. Chartrand and L. Lesniak: Graphs & Digraphs.Third edition. Chapman & Hall, London, 1996. MR 1408678
Reference: [2] R. Diestel: Graph Theory.Second Edition. Graduate Texts in Mathematics 173. Springer, New York, 2000. Zbl 0957.05001, MR 1743598
Reference: [3] G. A. Dirac: On rigid circuit graphs.Abh. Math. Univ. Hamburg 25 (1961), 71–76. Zbl 0098.14703, MR 0130190, 10.1007/BF02992776
Reference: [4] L. Nebeský: Signpost systems and connected graphs.Czech. Math. J. 55 (2005), 283–293. MR 2137138, 10.1007/s10587-005-0022-0
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