Contest based on a directed polymer in a random medium

Abstract

We introduce a simple one-parameter game derived from a model describing the properties of a directed polymer in a random medium. At his turn, each of the two players picks a move among two alternatives in order to maximize his final score, and minimize opponent's return. For a game of length n, we find that the probability distribution of the final score Sn develops a traveling wave form, Prob(Sn=m)=f(m-v n), with the wave profile f(z) unusually decaying as a double exponential for large positive and negative z. In addition, as the only parameter in the game is varied, we find a transition where one player is able to get his maximum theoretical score. By extending this model, we suggest that the front velocity v is selected by the nonlinear marginal stability mechanism arising in some traveling wave problems for which the profile decays exponentially, and for which standard traveling wave theory applies.