Criticality for Maker-Breaker domination games with predomination

Abstract

A predominated graph is a pair (G,D), where G is a graph and the vertices in D⊂eq V(G) are considered already dominated. Maker-Breaker domination game critical (MBD critical) predominated graphs are introduced as the predominated graphs (G,D) on which Staller wins the game, but Dominator wins on (G, D \v\) for every vertex v ∈ V(G) D. Tools are developed for handling the Maker-Breaker domination game on trees which lead to a characterization of Staller-win predominated trees. MBD critical predominated trees are characterized and an algorithm is designed which verifies in linear time whether a given predominated tree is MBD critical. A large class of MBD critical predominated cacti is presented and Maker-Breaker critical hypergraphs constructed.

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