The Allen-Cahn equation with weakly critical random initial datum

Abstract

This work considers the two-dimensional Allen-Cahn equation ∂t u = 12 u + m\, u -u3\;, u(0,x)= η (x)\;, ∀ (t,x) ∈ [0, ∞) × R2 \;, where the initial condition η is a two-dimensional white noise, which lies in the scaling critical space of initial data to the equation. In a weak coupling scaling, we establish a Gaussian limit with nontrivial size of fluctuations, thus casting the nonlinearity as marginally relevant. The result builds on a precise analysis of the Wild expansion of the solution and an understanding of the underlying stochastic and combinatorial structure. This gives rise to a representation for the limiting variance in terms of Butcher series associated to the solution of an ordinary differential equation.

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