$\mathrm{L}^p$-based Sobolev theory on closed manifolds of minimal regularity: Scalar Elliptic Equations

TL;DR

This paper develops an $ ext{L}^p$-based Sobolev theory for scalar elliptic PDEs on low-regularity manifolds, establishing well-posedness and regularity results by adapting classical PDE techniques to geometric settings.

Contribution

It extends $ ext{L}^p$-Sobolev regularity theory to scalar elliptic equations on manifolds with minimal regularity, using localization and Fredholm theory.

Findings

Proved $ ext{L}^p$-well-posedness for scalar elliptic problems on low-regularity manifolds.

Established higher regularity results via Calderón–Zygmund theory.

Applied Fredholm alternative to handle general elliptic problems in geometric settings.

Abstract

This paper and its follow-up arXiv:2508.11109 are concerned with the well-posedness and $\mathrm{L}^p$-based Sobolev regularity for appropriate weak formulations of a family of prototypical PDEs posed on manifolds of minimal regularity. In particular, the domains are assumed to be compact, connected $d$-dimensional manifolds without boundary of class $C^k$ and $C^{k-1,1}$ ($k \geq 1$) embedded in $\mathrm{R}^{d+1}$. The focus of this program is on the $\mathrm{L}^p$-based theory that is sharp with respect to the regularity of the source terms and the manifold. In the present paper, we focus our attention on the case of general scalar elliptic problems. We first establish $\mathrm{L}^p$-based well-posedness and higher regularity for the purely diffusive problems with variable coefficients by localizing and rewriting these equations in flat domains to employ the Calder\'{o}n--Zygmund theory, combined with duality arguments. We then invoke the Fredholm alternative to derive analogous results for general scalar elliptic problems, underscoring the subtle differences that the geometric setting entails compared to the theory in flat domains.