Bounds on the game isolation number and exact values for paths and cycles

Abstract

The isolation game is played on a graph G by two players who take turns playing a vertex such that if X is the set of already played vertices, then a vertex can be selected only if it dominates a vertex from a nontrivial component of G NG[X], where NG[X] is the set of vertices in X or adjacent to a vertex in X. Dominator wishes to finish the game with the minimum number of played vertices, while Staller has the opposite goal. The game isolation number ι g(G) is the number of moves in the Dominator-start game where both players play optimally. If Staller starts the game the invariant is denoted by ι g'(G). In this paper, ι g(Cn), ι g(Pn), ι g'(Cn), and ι g'(Pn) are determined for all n. It is proved that there are only two graphs that attain equality in the upper bound ι g(G) 12|V(G)|, and that there are precisely eleven graphs which attain equality in the upper bound ι g'(G) 12|V(G)|. For trees T of order at least three it is proved that ι g(T) 511|V(T)|. A new infinite family of graphs G is also constructed for which ι g(G) = ι g'(G) = 37|V(G)| holds.