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<metadata xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xmlns:dc="http://purl.org/dc/elements/1.1/"><dc:title>Thresholds for the biased Maker-Breaker domination games</dc:title><dc:creator>Brešar,	Boštjan	(Avtor)
	</dc:creator><dc:creator>Bujtás,	Csilla	(Avtor)
	</dc:creator><dc:creator>Dokyeesun,	Pakanun	(Avtor)
	</dc:creator><dc:creator>Dravec,	Tanja	(Avtor)
	</dc:creator><dc:subject>Maker-Breaker domination game</dc:subject><dc:subject>biased Maker-Breaker game</dc:subject><dc:subject>trees</dc:subject><dc:subject>line graph</dc:subject><dc:subject>grid</dc:subject><dc:description>In the $(a,b)$-biased Maker-Breaker domination game, two players alternately select unplayed vertices in a graph $G$ such that Dominator selects $a$ and Staller selects $b$ vertices per move. Dominator wins if the vertices he selected during the game form a dominating set of $G$, while Staller wins if she can prevent Dominator from achieving this goal. Given a positive integer $b$, Dominator's threshold, ${\rm a}_b$, is the minimum $a$ such that Dominator wins the $(a,b)$-biased game on $G$ when he starts the game. Similarly, ${\rm a}'_b$ denotes the minimum $a$ such that Dominator wins when Staller starts the $(a,b)$-biased game. Staller's thresholds, ${\rm b}_a$ and ${\rm b}'_a$, are defined analogously. It is proved that Staller wins the $(k-1,k)$-biased games in a graph $G$ if its order is sufficiently large with respect to a function of $k$ and the maximum degree of $G$. Along the way, the $\ell$-local domination number of a graph is introduced. This new parameter is proved to bound Dominator's thresholds ${\rm a}_\ell$ and ${\rm a}_\ell'$ from above. As a consequence, ${\rm a}_1'(G)\le 2$ holds for every claw-free graph $G$. More specific results are obtained for thresholds in line graphs and Cartesian grids. Based on the concept of $[1,k]$-factor of a graph $G$, we introduce the star partition width $\sigma(G)$ of $G$, and prove that ${\rm a}_1'(G)\le \sigma(G)$ holds  for any nontrivial graph $G$, while ${\rm a}_1'(G)=\sigma(G)$ if $G$ is a tree.</dc:description><dc:date>2025</dc:date><dc:date>2025-10-23 12:50:56</dc:date><dc:type>Članek v reviji</dc:type><dc:identifier>175289</dc:identifier><dc:identifier>UDK: 519.17</dc:identifier><dc:identifier>ISSN pri članku: 1365-8050</dc:identifier><dc:identifier>DOI: 10.46298/dmtcs.15392</dc:identifier><dc:identifier>COBISS_ID: 254459907</dc:identifier><dc:language>sl</dc:language></metadata>
