English

Renormalised Models for Variable Coefficient Singular SPDEs

Analysis of PDEs 2025-07-10 v1 Functional Analysis Probability

Abstract

In this work we prove convergence of renormalised models in the framework of regularity structures [Hai14] for a wide class of variable coefficient singular SPDEs in their full subcritical regimes. In particular, we provide for the first time an extension of the main results of [CH16, HS24, BH23] beyond the translation invariant setting. In the non-translation invariant setting, it is necessary to introduce renormalisation functions rather than renormalisation constants. We show that under a very general assumption, which we prove covers the case of second order parabolic operators, these renormalisation functions can be chosen to be local in the sense that their space-time dependence enters only through a finite order jet of the coefficient field of the differential operator at the given space-time point. Furthermore we show that the models we construct depend continuously on the coefficient field.

Keywords

Cite

@article{arxiv.2507.06851,
  title  = {Renormalised Models for Variable Coefficient Singular SPDEs},
  author = {Lucas Broux and Harprit Singh and Rhys Steele},
  journal= {arXiv preprint arXiv:2507.06851},
  year   = {2025}
}

Comments

95 pages

R2 v1 2026-07-01T03:53:11.860Z