English

The Constructor-Blocker Game

Combinatorics 2023-10-04 v4

Abstract

We study the following game version of the generalized graph Tur\'an problem. For two fixed graphs FF and HH, two players, Constructor and Blocker, alternately claim unclaimed edges of the complete graph KnK_n. Constructor can only claim edges so that he never claims all edges of any copy of FF, i.e. his graph must remain FF-free, while Blocker can claim unclaimed edges without restrictions. The game ends when Constructor cannot claim further edges or when all edges have been claimed. The score of the game is the number of copies of HH with all edges claimed by Constructor. Constructor's aim is to maximize the score, while Blocker tries to keep the score as low as possible. We denote by g(n,H,F)g(n,H,F) the score of the game when both players play optimally and Constructor starts the game. In this paper, we obtain the exact value of g(n,H,F)g(n,H,F) when both FF and HH are stars and when F=P4F=P_4, H=P3H=P_3. We determine the asymptotics of g(n,H,F)g(n,H,F) when FF is a star and HH is a tree and when F=P5F=P_5, H=K3H=K_3, and we derive upper and lower bounds on g(n,P4,P5)g(n,P_4,P_5).

Keywords

Cite

@article{arxiv.2203.14707,
  title  = {The Constructor-Blocker Game},
  author = {Balázs Patkós and Miloš Stojaković and Máté Vizer},
  journal= {arXiv preprint arXiv:2203.14707},
  year   = {2023}
}
R2 v1 2026-06-24T10:28:17.620Z