Phase transition in a sequential assignment problem on graphs
Abstract
We study the following game on a finite graph . At the start, each edge is assigned an integer , . In round , , a uniformly random vertex is chosen and one of the edges incident with is selected by the player. The value assigned to is then decreased by . The player wins, if the configuration is reached; in other words, the edge values never go negative. Our main result is that there is a phase transition: as , the probability that the player wins approaches a constant when converges to a point in the interior of a certain convex set , and goes to exponentially when is bounded away from . We also obtain upper bounds in the near-critical region, that is when lies close to . We supply quantitative error bounds in our arguments.
Cite
@article{arxiv.1507.04169,
title = {Phase transition in a sequential assignment problem on graphs},
author = {Antal A. Járai},
journal= {arXiv preprint arXiv:1507.04169},
year = {2016}
}
Comments
28 pages, 2 eps figures. Some mistakes have been corrected, and the introduction has been re-written. Minor corrections throughout