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CORR
2010
Springer
2010
Springer
Hitting time results for Maker-Breaker games
We study Maker-Breaker games played on the edge set of a random graph. Specifically, we consider the random graph process and analyze the first time in a typical random graph process that Maker starts having a winning strategy for his final graph to admit some property P. We focus on three natural properties for Maker's graph, namely being k-vertex-connected, admitting a perfect matching, and being Hamiltonian. We prove the following optimal hitting time results: with high probability Maker wins the k-vertex connectivity game exactly at the time the random graph process first reaches minimum degree 2k; with high probability Maker wins the perfect matching game exactly at the time the random graph process first reaches minimum degree 2; with high probability Maker wins the Hamiltonicity game exactly at the time the random graph process first reaches minimum degree 4. The latter two statements settle conjectures of Stojakovi
Real-time Traffic| Added | 09 Dec 2010 |
| Updated | 09 Dec 2010 |
| Type | Journal |
| Year | 2010 |
| Where | CORR |
| Authors | Sonny Ben-Shimon, Asaf Ferber, Dan Hefetz, Michael Krivelevich |
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