Gaussian Fluctuations for the Stochastic Landau-Lifshitz Navier-Stokes Equation in Dimension D≥2

Abstract

We revisit the large-scale Gaussian fluctuations for the stochastic Landau-Lifshitz Navier-Stokes equation (LLNS) at and above criticality, using the method in CGT24. With the classical diffusive scaling in d≥ 3 and weak coupling scaling in d=2, we obtain the convergence of the regularised LLNS to a stochastic heat equation with a non-trivially renormalized coefficient. Moreover, we obtain an asymptotic expansion of the effective coefficient when d≥3, and show that the one in [Conjecture 6.5]JP24 is incorrect. The new ingredient in our proof is a case-by-case analysis to track the evolution of the vector under the action of the Leray projection, combined with the use of the anti-symmetric part of the generator and a rotational change of coordinates to derive the desired decoupled stochastic heat equation from the original coupled system.

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