About the Functional Form of the Parisi Overlap Distribution for the Three-Dimensional Edwards-Anderson Ising Spin Glass
Abstract
Recently, it has been conjectured that the statistics of extremes is of relevance for a large class of correlated system. For certain probability densities this predicts the characteristic large x fall-off behavior f(x) (-a ex), a>0. Using a multicanonical Monte Carlo technique, we have calculated the Parisi overlap distribution P(q) for the three-dimensional Edward-Anderson Ising spin glass at and below the critical temperature, even where P(q) is exponentially small. We find that a probability distribution related to extreme order statistics gives an excellent description of P(q) over about 80 orders of magnitude.
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