笛卡尔积的取向色数Pm□Pn和Cm□Pn

Pub Date : 2022-06-29 DOI:10.7151/dmgt.2307

Anna Nenca

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引用次数: 1

摘要

摘要我们考虑两条路径Pm的笛卡尔乘积的有向色数□ Pn和路径与循环的笛卡尔乘积Cm□ Pn.我们说有向图G→ \向量G由有向图H着色→ \vec H如果存在来自G的同态→ \向量G到H→ \vec H。本文证明了存在一个定向锦标赛H→具有十个顶点的10｛\vec H_｛10｝｝，这些顶点为P8的每个方向着色□ Pn和Cm的每个方向□ Pn，当m=3、4、5、6、7且n≥1时。我们还证明了存在一个有向图T→具有16个顶点的16｛\vec T_｛16｝｝□ Pn。

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Oriented Chromatic Number of Cartesian Products Pm □ Pn and Cm □ Pn

Abstract We consider oriented chromatic number of Cartesian products of two paths Pm □ Pn and of Cartesian products of paths and cycles, Cm □ Pn. We say that the oriented graph G→ \vec G is colored by an oriented graph H→ \vec H if there is a homomorphism from G→ \vec G to H→ \vec H . In this paper we show that there exists an oriented tournament H→10 {\vec H_{10}} with ten vertices which colors every orientation of P8 □ Pn and every orientation of Cm □ Pn, for m = 3, 4, 5, 6, 7 and n ≥ 1. We also show that there exists an oriented graph T→16 {\vec T_{16}} with sixteen vertices which colors every orientation of Cm □ Pn.

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