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Domination game on uniform hypergraphs
In this paper we introduce and study the domination game on hypergraphs. This
is played on a hypergraph by two players, namely Dominator and
Staller, who alternately select vertices such that each selected vertex
enlarges the set of vertices dominated so far. The game is over if all vertices
of are dominated. Dominator aims to finish the game as soon as
possible, while Staller aims to delay the end of the game. If each player plays
optimally and Dominator starts, the length of the game is the invariant `game
domination number' denoted by . This definition is the
generalization of the domination game played on graphs and it is a special case
of the transversal game on hypergraphs. After some basic general results, we
establish an asymptotically tight upper bound on the game domination number of
-uniform hypergraphs. In the remaining part of the paper we prove that
if is a 3-uniform hypergraph of
order and does not contain isolated vertices. This also implies the
following new result for graphs: If is an isolate-free graph on
vertices and each of its edges is contained in a triangle, then