Intrinsic Cheeger energy for the intrinsically Lipschitz constants

TL;DR

This paper extends Cheeger energy concepts to metric spaces with intrinsically Lipschitz sections, defining an intrinsic Cheeger energy and characterizing it via relaxed slopes, advancing analysis in metric measure spaces.

Contribution

It introduces an intrinsic Cheeger energy for intrinsically Lipschitz sections in metric spaces and characterizes it through relaxed slopes, adapting classical theory to new contexts.

Findings

Defined intrinsic Cheeger energy in metric measure spaces.

Characterized the energy using relaxed slopes.

Proved properties like Leibniz and product formulas.

Abstract

Recently, in the metric spaces, Le Donne and the author introduced the so-called intrinsically Lipschitz sections. The main aim of this note is to adapt Cheeger theory for the classical Lipschitz constants in our new context. More precisely, we define the intrinsic Cheeger energy from $L^2(Y,\R^s)$ to $[0,+\infty],$ where $(Y,d_Y,\mm)$ is a metric measure space and we characterize it in terms of a suitable notion of relaxed slope. In order to get this result, in more general context, we establish some properties of the intrinsically Lipschitz constants like the Leibniz formula, the product formula and the upper semicontinuity of the asymptotic intrinsically Lipschitz constant.