Litcius/Paper detail

New formulas for the Laplacian of distance functions and applications

Cavalletti, F, Mondino, A

2020Oxford University Research Archive (ORA) (University of Oxford)31 citations

Abstract

The goal of the paper is to prove an exact representation formula for the Laplacian of the distance (and more generally for an arbitrary 1-Lipschitz function) in the framework of metric measure spaces satisfying Ricci curvature lower bounds in a synthetic sense (more precisely in essentially non-branching MCP(K,N)-spaces). Such a representation formula makes apparent the classical upper bounds and also some new lower bounds, together with a precise description of the singular part. The exact representation formula for the Laplacian of 1-Lipschitz functions (in particular for distance functions) holds also (and seems new) in a general complete Riemannian manifold. We apply these results to prove the equivalence of CD(K,N) and a dimensional Bochner inequality on signed distance functions. Moreover we obtain a measure-theoretic Splitting Theorem for infinitesimally Hilbertian essentially non-branching spaces verifying MCP(0,N).

Topics & Concepts

MathematicsLipschitz continuityPure mathematicsLaplace operatorInfinitesimalMeasure (data warehouse)Ricci curvatureEquivalence (formal languages)Metric spaceSimplexCurvatureMathematical analysisDiscrete mathematicsCombinatoricsGeometryComputer scienceDatabaseGeometric Analysis and Curvature FlowsGeometry and complex manifoldsPoint processes and geometric inequalities