English

Z-domination game

Combinatorics 2019-11-21 v1

Abstract

The Z-domination game is a variant of the domination game in which each newly selected vertex uu in the game must have a not yet dominated neighbor, but after the move all vertices from the closed neighborhood of uu are declared to be dominated. The Z-domination game is the fastest among the five natural domination games. The corresponding game Z-domination number of a graph GG is denoted by γZg(G)\gamma_{Zg}(G). It is proved that the game domination number and the game total domination number of a graph can be expressed as the game Z-domination number of appropriate lexicographic products. Graphs with a Z-insensitive property are introduced and it is proved that if GG is Z-insensitive, then γZg(G)\gamma_{Zg}(G) is equal to the game domination number of GG. Weakly claw-free graphs are defined and proved to be Z-insensitive. As a consequence, γZg(Pn)\gamma_{Zg}(P_n) is determined, thus sharpening an earlier related approximate result. It is proved that if γZg(G)\gamma_{Zg}(G) is an even number, then γZg(G)\gamma_{Zg}(G) is strictly smaller than the game L-domination number. On the other hand, families of graphs are constructed for which all five game domination numbers coincide. Graphs GG with γZg(G)=γ(G)\gamma_{Zg}(G) = \gamma(G) are also considered and computational results which compare the studied invariants in the class of trees on at most 1616 vertices reported.

Keywords

Cite

@article{arxiv.1911.08889,
  title  = {Z-domination game},
  author = {Csilla Bujtás and Vesna Iršič and Sandi Klavžar},
  journal= {arXiv preprint arXiv:1911.08889},
  year   = {2019}
}

Comments

15 pages, 1 figure, 1 table

R2 v1 2026-06-23T12:22:13.511Z