Ricci curvature bounds and rigidity for non-smooth Riemannian and semi-Riemannian metrics

Abstract

We study rigidity problems for Riemannian and semi-Riemannian manifolds with metrics of low regularity. Specifically, we prove a version of the Cheeger-Gromoll splitting theorem CheegerGromoll72splitting for Riemannian metrics and the flatness criterion for semi-Riemannian metrics of regularity C1. With our proof of the splitting theorem, we are able to obtain an isometry of higher regularity than the Lipschitz regularity guaranteed by the RCD-splitting theorem gigli2013splitting, gigli2014splitoverview. Along the way, we establish a Bochner-Weitzenb\"ock identity which permits both the non-smoothness of the metric and of the vector fields, complementing a recent similar result in mondino2024equivalence. The last section of the article is dedicated to the discussion of various notions of Sobolev spaces in low regularity, as well as an alternative proof of the equivalence (see mondino2024equivalence) between distributional Ricci curvature bounds and RCD-type bounds, using in part the stability of the variable CD-condition under suitable limits ketterer2017variableCD.