On the differential structure of metric measure spaces and applications

The main goals of this paper are: i) To develop an abstract differential calculus on metric measure spaces by investigating the duality relations between differentials and gradients of Sobolev functions. This will be achieved without calling into play any sort of analysis in charts, our assumptions being: the metric space is complete and separable and the measure is Borel, non negative and locally finite. ii) To employ these notions of calculus to provide, via integration by parts, a general definition of distributional Laplacian, thus giving a meaning to an expression like $\Delta g=\mu$, where $g$ is a function and $\mu$ is a measure. iii) To show that on spaces with Ricci curvature bounded from below and dimension bounded from above, the Laplacian of the distance function is always a measure and that this measure has the standard sharp comparison properties. This result requires an additional assumption on the space, which reduces to strict convexity of the norm in the case of smooth Finsler structure and is always satisfied on spaces with linear Laplacian, a situation which is analyzed in detail.

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Field Value
Source https://hal.science/hal-00769371
Author Gigli, Nicola
Maintainer CCSD
Last Updated May 29, 2026, 03:48 (UTC)
Created May 29, 2026, 03:48 (UTC)
Identifier hal-00769371
Language en
contributor Laboratoire Jean Alexandre Dieudonné (LJAD) ; Université Nice Sophia Antipolis (1965 - 2019) (UNS)-Centre National de la Recherche Scientifique (CNRS)-Université Côte d'Azur (UniCA)
creator Gigli, Nicola
date 2012-05-30T00:00:00
harvest_object_id 57bd3af5-e734-4b45-b452-006b067b6722
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2025-06-23T00:00:00
relation info:eu-repo/semantics/altIdentifier/arxiv/1205.6622
set_spec type:UNDEFINED