Weak universality of the dynamical $Φ_3^4$ model on the whole space
Abstract: We prove the large scale convergence of a class of stochastic weakly nonlinear reaction-diffusion models on $\mathbb{R}3$ to the dynamical $\Phi4_3$ model by paracontrolled distributions on weighted Besov space. Our approach depends on the delicate choice of the weight, the localization operator technique and a modification version of the maximal principle from [GH18].
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