Hyperskewness of (1+1)-dimensional KPZ Height Fluctuations
Abstract
We evaluate the fifth order normalized cumulant, known as hyperskewness, of height fluctuations dictated by the (1+1)-dimensional KPZ equation for the stochastic growth of a surface on a flat geometry in the stationary state. We follow a diagrammatic approach and invoke a renormalization scheme to calculate the fifth cumulant given by a connected loop diagram. This, together with the result for the second cumulant, leads to the hyperskewness value S = 0.0835.
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