Riemannian Ricci curvature lower bounds in metric measure spaces with $\sigma$-finite measure

TL;DR

This paper extends the Riemannian Curvature Dimension condition $RCD(K,\infty)$ to metric measure spaces with $\sigma$-finite measures, including Euclidean spaces and noncompact manifolds, using optimal transportation and gradient flow techniques.

Contribution

It generalizes the $RCD(K,\infty)$ framework to $\sigma$-finite measures and simplifies the axiomatization by replacing strict $CD(K,\infty)$ with the classic $CD(K,\infty)$.

Findings

Extension of $RCD(K,\infty)$ to $\sigma$-finite measures.

Inclusion of Euclidean spaces and noncompact manifolds.

Simplified axiomatization of the $RCD(K,\infty)$ condition.

Abstract

Using techniques of optimal transportation and gradient flows in metric spaces, we extend the notion of Riemannian Curvature Dimension condition $RCD(K,\infty)$ introduced (in case the reference measure is finite) by Giuseppe Savare', the first and the second author, to the case the reference measure is $\sigma$-finite; in this way the theory includes natural examples as the euclidean $n$-dimensional space endowed with the Lebesgue measure, and noncompact manifolds with bounded geometry endowed with the Riemannian volume measure. Another major goal of the paper is to simplify the axiomatization of $RCD(K,\infty)$ (even in case of finite reference measure) replacing the assumption of strict $CD(K,\infty)$ with the classic notion of $CD(K,\infty)$.