Total isolation game in graphs

Abstract

The total isolation game is played on a graph G by two players who take turns playing a vertex such that if S is the set of already played vertices, then a vertex can be selected only if it is adjacent to a vertex that belongs to a (nontrivial) component of the graph G - NG(S) of order at least 2 or a vertex that is isolated in G - NG(S) and belongs to the set S, where NG(S) is the set of vertices adjacent to a vertex in S. Dominator wishes to finish the game with the minimum number of played vertices, while Staller has the opposite goal. The game total isolation number gt(G) is the number of moves in the Dominator-start game where both players play optimally. We prove that if G is a connected graph of order n 3, then gt(G) < 56n. Furthermore if G has minimum degree at least 2, then we prove that gt(G) 34n. More generally, if G is a connected graph of order n 3 with minimum degree δ where δ 2, then we prove that gt(G) ( 2δ-13δ-2 ) n. Among other results it is proved that if G is a graph of order n with diameter 2, then gt(G) 23n.