English

Regularity Structures on Manifolds and Vector Bundles

Probability 2023-08-10 v1

Abstract

We develop a generalisation of the original theory of regularity structures, [Hai14], which is able to treat SPDEs on manifolds with values in vector bundles. Assume MM is a Riemannian manifold and EME\to M and FiMF^i\to M are vector bundles (with a metric and connection), this theory allows to solve subcritical equations of the form tu+Lu=i=0mGi(u,u,,nu)ξi , \partial_t u + \mathcal{L}u = \sum_{i=0}^m G_i(u, \nabla u,\ldots, \nabla^n u)\xi_i\ , where uu is a (generalised) section of EE, L\mathcal{L} is a uniformly elliptic operator on EE of order strictly greater than nn, the ξi\xi_i are FiF^i-valued random distributions (e.g. FiF^i-valued white noises), and the Gi:E×TME××(TM)nEL(Fi,E)G_i:E\times TM^*\otimes E \times\ldots\times (TM^*)^{\otimes n} \otimes E \to L(F^i ,E) are local functions. We apply our framework to three example equations which illustrate that when L\mathcal{L} is a Laplacian it is possible in most cases to renormalise such equations by adding spatially homogeneous counterterms and we discuss in which cases more sophisticated renormalisation procedures (involving the curvature of the underlying manifold) are required.

Keywords

Cite

@article{arxiv.2308.05049,
  title  = {Regularity Structures on Manifolds and Vector Bundles},
  author = {Martin Hairer and Harprit Singh},
  journal= {arXiv preprint arXiv:2308.05049},
  year   = {2023}
}
R2 v1 2026-06-28T11:52:02.554Z