Singular stochastic PDEs

TL;DR

This paper reviews recent advances in the well-posedness of highly singular parabolic stochastic PDEs, utilizing the theory of regularity structures, with a focus on the KPZ equation as a key example.

Contribution

It applies the theory of regularity structures to establish well-posedness for complex singular stochastic PDEs like the KPZ equation.

Findings

Established well-posedness of singular SPDEs using regularity structures

Applied the framework specifically to the KPZ equation

Demonstrated local solution descriptions via custom-built objects

Abstract

We present a series of recent results on the well-posedness of very singular parabolic stochastic partial differential equations. These equations are such that the question of what it even means to be a solution is highly non-trivial. This problem can be addressed within the framework of the recently developed theory of "regularity structures", which allows to describe candidate solutions locally by a "jet", but where the usual Taylor polynomials are replaced by a sequence of custom-built objects. In order to illustrate the theory, we focus on the particular example of the Kardar-Parisi-Zhang equation, a popular model for interface propagation.