Total domination in plane triangulations

M. Claverol; A. Garc\'ia; G. Hern\'andez; C. Hernando; M. Maureso; M.; Mora; J. Tejel

arXiv:2011.04255·math.CO·May 9, 2024·1 cites

Total domination in plane triangulations

M. Claverol, A. Garc\'ia, G. Hern\'andez, C. Hernando, M. Maureso, M., Mora, J. Tejel

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Abstract

A total dominating set of a graph $G = (V, E)$ is a subset $D$ of $V$ such that every vertex in $V$ is adjacent to at least one vertex in $D$ . The total domination number of $G$ , denoted by $γ_{t} (G)$ , is the minimum cardinality of a total dominating set of $G$ . A near-triangulation is a biconnected planar graph that admits a plane embedding such that all of its faces are triangles except possibly the outer face. We show in this paper that $γ_{t} (G) \leq ⌊ \frac{2 n}{5} ⌋$ for any near-triangulation $G$ of order $n \geq 5$ , with two exceptions.

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TopicsAdvanced Graph Theory Research · Computational Geometry and Mesh Generation · Graph Labeling and Dimension Problems