1. Vertex-edge marking score of certain triangular lattices
- Author
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Herden, Daniel, Meddaugh, Jonathan, Sepanski, Mark, Echols, Isaac, Garcia-Montoya, Nina, Hammon, Cordell, Huang, Guanjie, Kraus, Adam, Menendez, Jorge Marchena, Mohn, Jasmin, and Jiménez, Rafael Morales
- Subjects
Mathematics - Combinatorics ,05C15, 05C57 - Abstract
The vertex-edge marking game is played between two players on a graph, $G=(V,E)$, with one player marking vertices and the other marking edges. The players want to minimize/maximize, respectively, the number of marked edges incident to an unmarked vertex. The vertex-edge coloring number for $G$ is the maximum score achievable with perfect play. Bre\v{s}ar et al., [4], give an upper bound of $5$ for the vertex-edge coloring number for finite planar graphs. It is not known whether the bound is tight. In this paper, in response to questions in [4], we show that the vertex-edge coloring number for the infinite regular triangularization of the plane is 4. We also give two general techniques that allow us to calculate the vertex-edge coloring number in many related triangularizations of the plane., Comment: 7 pages
- Published
- 2022