English

The Maker-Breaker directed triangle game

Combinatorics 2026-04-20 v2 Probability

Abstract

In this work, we investigate Maker-Breaker directed triangle games, a directionally constrained variant of the classical Maker-Breaker triangle game. Our board of interest is a tournament, and the winning sets are all 33-cycles present in the tournament. We begin by studying the Maker-Breaker directed triangle game played on a specially defined tournament called the parity tournament, and we identify the board size threshold to be n=7n=7, which is to say that for a parity tournament on nn vertices, Breaker has a winning strategy for 3n<73\le n<7, while Maker can ensure a win for herself for n7n\ge7. For the (1:b)(1:b) biased version of this game, we prove that the bias threshold b(n)b^*(n) satisfies (1/12+o(1))nb(n)(8/3+o(1))n\sqrt{\left(1/12+o(1)\right)n}\le b^*(n)\le\sqrt{\left(8/3+o(1)\right)n}, which matches the order of magnitude, namely n\sqrt n, of the bias threshold for the undirected counterpart of this game. Next, we consider the game on random tournaments T(n,p)T(n,p), wherein the edge between ii and jj, for each i<ji<j, is directed from ii to jj with probability pp, independent of all else. We prove that Maker wins this game with probability tending to 11 as nn\to\infty for any fixed p(0,1)p\in(0,1). Extending the notion of bias from undirected games to our directed framework, we introduce the flip-biased Maker-Breaker directed triangle game on the parity tournament with flip budget κ(n)\kappa(n), where Breaker may strategically flip the directions of at most κ(n)\kappa(n) edges before the game begins. We show that the flip-bias threshold κ(n)\kappa^*(n) for this game is of order n2n^2. More precisely, for odd n11n\ge11 we show n(n11)/12κ(n)(n21)/8n(n-11)/12\le\kappa^*(n)\le (n^2-1)/8, and for even n14n\ge14 we show n(n14)/12+1κ(n)n2/8+n/41n(n-14)/12+1\le\kappa^*(n)\le n^2/8+n/4-1.

Keywords

Cite

@article{arxiv.2510.13919,
  title  = {The Maker-Breaker directed triangle game},
  author = {Hrishikesh Jagtap and Moumanti Podder},
  journal= {arXiv preprint arXiv:2510.13919},
  year   = {2026}
}
R2 v1 2026-07-01T06:39:41.857Z