It\o perspective on variance renormalisation

Abstract

We show that the It\o solutions of the nonlinear stochastic heat equation ∂t u- u =3/4 g (u) ∇ , where denotes the mollification in space at scale >0 of a space-time white noise , converge in law, as 0, to the solution of the stochastic heat equation with right-hand side cg'g(u) with a constant c>0. Since the noise ∇ is supercritical, the small prefactor is not unexpected to obtain a limit, but the exponent 3/4 is not predicted by naive scaling arguments. The case g(u)=u, modulo a Cole-Hopf transform, corresponds to the result of [Hai25] for the KPZ equation. Our argument is relatively short and relies solely on stochastic analytic techniques.

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