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Main Authors: Brito, João Marcos, Marcilon, Thiago, Martins, Nicolas, Sampaio, Rudini
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.13118
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author Brito, João Marcos
Marcilon, Thiago
Martins, Nicolas
Sampaio, Rudini
author_facet Brito, João Marcos
Marcilon, Thiago
Martins, Nicolas
Sampaio, Rudini
contents In 2010, Brešar, Klavžar and Rall introduced the optimization variant of the graph domination game and the game domination number, which was proved PSPACE-hard by Brešar et al. in 2016. In 2024, Leo Versteegen obtained the celebrated proof of the Conjecture $\frac{3}{5}$ on this variant of the domination game, proposed by Kinnersley, West and Zamani in 2013. In this paper, we investigate for the first time the normal play of the domination game, which we call Normal Domination Game, that is an impartial game where the last to play wins. We first prove that this game is PSPACE-complete even in graphs with diameter two. We also use the Sprague-Grundy theory to prove that Alice (the first player) wins in the path $P_n$ if and only if $n$ is not a multiple of $4$, and wins in the cycle $C_n$ if and only if $n=4k+3$ for some integer $k$. Moreover, we obtain a polynomial time algorithm to decide the winner for any disjoint union of paths and cycles in the Normal Domination Game and its natural partizan variant. Finally, we also prove that the Misère Domination Game (the last to play loses) is PSPACE-complete, as are the natural partizan variants of the normal game and the misère game.
format Preprint
id arxiv_https___arxiv_org_abs_2502_13118
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The Normal Play of the Domination Game
Brito, João Marcos
Marcilon, Thiago
Martins, Nicolas
Sampaio, Rudini
Combinatorics
Discrete Mathematics
In 2010, Brešar, Klavžar and Rall introduced the optimization variant of the graph domination game and the game domination number, which was proved PSPACE-hard by Brešar et al. in 2016. In 2024, Leo Versteegen obtained the celebrated proof of the Conjecture $\frac{3}{5}$ on this variant of the domination game, proposed by Kinnersley, West and Zamani in 2013. In this paper, we investigate for the first time the normal play of the domination game, which we call Normal Domination Game, that is an impartial game where the last to play wins. We first prove that this game is PSPACE-complete even in graphs with diameter two. We also use the Sprague-Grundy theory to prove that Alice (the first player) wins in the path $P_n$ if and only if $n$ is not a multiple of $4$, and wins in the cycle $C_n$ if and only if $n=4k+3$ for some integer $k$. Moreover, we obtain a polynomial time algorithm to decide the winner for any disjoint union of paths and cycles in the Normal Domination Game and its natural partizan variant. Finally, we also prove that the Misère Domination Game (the last to play loses) is PSPACE-complete, as are the natural partizan variants of the normal game and the misère game.
title The Normal Play of the Domination Game
topic Combinatorics
Discrete Mathematics
url https://arxiv.org/abs/2502.13118