English

Isolation game on graphs

Combinatorics 2024-09-24 v1

Abstract

Given a graph GG and a family of graphs F\cal F, an F\cal F-isolating set, as introduced by Caro and Hansberg, is any set SV(G)S\subset V(G) such that GN[S]G - N[S] contains no member of F\cal F as a subgraph. In this paper, we introduce a game in which two players with opposite goals are together building an F\cal F-isolating set in GG. Following the domination games, Dominator (Staller) wants that the resulting F\cal F-isolating set obtained at the end of the game, is as small (as big) as possible, which leads to the graph invariant called the game F\cal F-isolation number, denoted ιg(G,F)\iota_{\rm g}(G,\cal F). We prove that the Continuation Principle holds in the F\cal F-isolation game, and that the difference between the game F\cal F-isolation numbers when either Dominator or Staller starts the game is at most 11. Considering two arbitrary families of graphs F\cal F and F\cal F', we find relations between them that ensure ιg(G,F)ιg(G,F)\iota_{\rm g}(G,{\cal{F}}') \leq \iota_{\rm g}(G,{\cal{F}}) for any graph GG. A special focus is given on the isolation game, which takes place when F={K2}{\cal F}=\{K_2\}. We prove that ιg(G,{K2})V(G)/2\iota_{\rm g}(G,\{K_2\})\le |V(G)|/2 for any graph GG, and conjecture that 3V(G)/7\lceil 3|V(G)|/7\rceil is the actual (sharp) upper bound. We prove that the isolation game on a forest when Dominator has the first move never lasts longer than the one in which Staller starts the game. Finally, we prove good lower and upper bounds on the game isolation numbers of paths PnP_n, which lead to the exact values ιg(Pn,{K2})=2n+25\iota_{\rm g}(P_n,\{K_2\})=\left\lfloor\frac{2n+2}{5}\right\rfloor when ni(mod5)n \equiv i \pmod 5 and i{1,2,3}i \in \{1,2,3\}.

Keywords

Cite

@article{arxiv.2409.14180,
  title  = {Isolation game on graphs},
  author = {Boštjan Brešar and Tanja Dravec and Daniel P. Johnston and Kirsti Kuenzel and Douglas F. Rall},
  journal= {arXiv preprint arXiv:2409.14180},
  year   = {2024}
}

Comments

15 pages, 1 figure, 18 references

R2 v1 2026-06-28T18:52:26.586Z