Weak coupling limit of the Anisotropic KPZ equation

Abstract

In the present work, we study the two-dimensional anisotropic KPZ equation (AKPZ), which is formally given by equation* ∂t h=12 h + λ ((∂1 h)2)-(∂2 h)2) +\,, equation* where denotes a space-time white noise and λ>0 is the so-called coupling constant. The AKPZ equation is a critical SPDE, meaning that not only it is analytically ill-posed but also the breakthrough path-wise techniques for singular SPDEs [M. Hairer, Ann. Math. 2014] and [M. Gubinelli, P. Imkeller and N. Perkowski, Forum of Math., Pi, 2015] are not applicable. As shown in [G. Cannizzaro, D. Erhard, F. Toninelli, arXiv, 2020], the equation regularised at scale N has a diffusion coefficient that diverges logarithmically as the regularisation is removed in the limit N∞. Here, we study the weak coupling limit where λ=λN=λ/ N: this is the correct scaling that guarantees that the nonlinearity has a still non-trivial but non-divergent effect. In fact, as N∞ the sequence of equations converges to the linear stochastic heat equation equation* ∂t h = eff2 h + eff\,, equation* where eff >1 is explicit and depends non-trivially on λ. This is the first full renormalization-type result for a critical, singular SPDE which cannot be linearised via Cole-Hopf or any other transformation.