Global well-posedness for 2D generalized Parabolic Anderson Model via paracontrolled calculus

Abstract

This article revisits the problem of global well-posedness for the generalized parabolic Anderson model on R+× T2 within the framework of paracontrolled calculus GIP15. The model is given by the equation: equation* (∂t-) u=F(u)η equation* where η∈ C-1- with 1/6>>0, and F∈ Cb2(R). Assume that η∈ C-1- and can be lifted to enhanced noise, we derive new a priori bounds. The key idea follows from the recent work CFW24 by A.Chandra, G.L. Feltes and H.Weber to represent the leading error term as a transport type term, and our techniques encompass the paracontrolled calculus, the maximum principle, and the localization approach (i.e. high-low frequency argument).