Strong games played on random graphs
Discrete Mathematics
2015-07-19 v1 Computer Science and Game Theory
Combinatorics
Abstract
In a strong game played on the edge set of a graph G there are two players, Red and Blue, alternating turns in claiming previously unclaimed edges of G (with Red playing first). The winner is the first one to claim all the edges of some target structure (such as a clique, a perfect matching, a Hamilton cycle, etc.). It is well known that Red can always ensure at least a draw in any strong game, but finding explicit winning strategies is a difficult and a quite rare task. We consider strong games played on the edge set of a random graph G ~ G(n,p) on n vertices. We prove, for sufficiently large and a fixed constant 0 < p < 1, that Red can w.h.p win the perfect matching game on a random graph G ~ G(n,p).
Keywords
Cite
@article{arxiv.1507.04229,
title = {Strong games played on random graphs},
author = {Asaf Ferber and Pascal Pfister},
journal= {arXiv preprint arXiv:1507.04229},
year = {2015}
}