The Maker-Breaker directed triangle game
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 -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 , which is to say that for a parity tournament on vertices, Breaker has a winning strategy for , while Maker can ensure a win for herself for . For the biased version of this game, we prove that the bias threshold satisfies , which matches the order of magnitude, namely , of the bias threshold for the undirected counterpart of this game. Next, we consider the game on random tournaments , wherein the edge between and , for each , is directed from to with probability , independent of all else. We prove that Maker wins this game with probability tending to as for any fixed . 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 , where Breaker may strategically flip the directions of at most edges before the game begins. We show that the flip-bias threshold for this game is of order . More precisely, for odd we show , and for even we show .
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}
}