Kernels and cycles' subdivisions in arc-colored tournaments

Pietra Delgado-Escalante; Hortensia Galeana-Sánchez

Pietra Delgado-Escalante ; Hortensia Galeana-Sánchez

Discussiones Mathematicae Graph Theory, Tome 29 (2009), p. 101-117 / Harvested from The Polish Digital Mathematics Library

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Résumé

Let D be a digraph. D is said to be an m-colored digraph if the arcs of D are colored with m colors. A path P in D is called monochromatic if all of its arcs are colored alike. Let D be an m-colored digraph. A set N ⊆ V(D) is said to be a kernel by monochromatic paths of D if it satisfies the following conditions: a) for every pair of different vertices u,v ∈ N there is no monochromatic directed path between them; and b) for every vertex x ∈ V(D)-N there is a vertex n ∈ N such that there is an xn-monochromatic directed path in D. In this paper we prove that if T is an arc-colored tournament which does not contain certain subdivisions of cycles then it possesses a kernel by monochromatic paths. These results generalize a well known sufficient condition for the existence of a kernel by monochromatic paths obtained by Shen Minggang in 1988 and another one obtained by Hahn et al. in 2004. Some open problems are proposed.

Publié le : 2009-01-01

Zbl 1213.05108

EUDML-ID : urn:eudml:doc:270273

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     pages = {101-117},
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Pietra Delgado-Escalante; Hortensia Galeana-Sánchez. Kernels and cycles' subdivisions in arc-colored tournaments. Discussiones Mathematicae Graph Theory, Tome 29 (2009) pp. 101-117. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-doi-10_7151_dmgt_1435/

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