Distribution of extremes in the fluctuations of two-dimensional equilibrium interfaces

Abstract

We investigate the statistics of the maximal fluctuation of two-dimensional Gaussian interfaces. Its relation to the entropic repulsion between rigid walls and a confined interface is used to derive the average maximal fluctuation <m> 2/(π K) N and the asymptotic behavior of the whole distribution P(m) N2 e- (const) N2 e-2π K m - 2π K m for m finite with N2 and K the interface size and tension, respectively. The standardized form of P(m) does not depend on N or K, but shows a good agreement with Gumbel's first asymptote distribution with a particular non-integer parameter. The effects of the correlations among individual fluctuations on the extreme value statistics are discussed in our findings.

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