Maker-Breaker resolving game
Abstract
A set of vertices of a graph is a resolving set if every vertex of is uniquely determined by its vector of distances to . In this paper, the Maker-Breaker resolving game is introduced. The game is played on a graph by Resolver and Spoiler who alternately select a vertex of not yet chosen. Resolver wins if at some point the vertices chosen by him form a resolving set of , whereas Spoiler wins if the Resolver cannot form a resolving set of . The outcome of the game is denoted by and (resp. ) denotes the minimum number of moves of Resolver (resp. Spoiler) to win when Resolver has the first move. The corresponding invariants for the game when Spoiler has the first move are denoted by and . Invariants , , , and are compared among themselves and with the metric dimension . A large class of graphs is constructed for which holds. The effect of twin equivalence classes and pairing resolving sets on the Maker-Breaker resolving game is described. As an application , as well as and (or and ), are determined for several graph classes, including trees, complete multi-partite graphs, grid graphs, and torus grid graphs.
Keywords
Cite
@article{arxiv.2005.13242,
title = {Maker-Breaker resolving game},
author = {Cong X. Kang and Sandi Klavžar and Ismael G. Yero and Eunjeong Yi},
journal= {arXiv preprint arXiv:2005.13242},
year = {2020}
}