Modulus and the Poincaré inequality on metric measure spaces

Stephen Keith*

*Corresponding author for this work

Research output: Contribution to journalReview articlepeer-review

96 Citations (Scopus)

Abstract

The purpose of this paper is to develop the understanding of modulus and the Poincaré inequality, as defined on metric measure spaces. Various definitions for modulus and capacity are shown to coincide for general collections of metric measure spaces. Consequently, modulus is shown to be upper semi-continuous with respect to the limit of a sequence of curve families contained in a converging sequence of metric measure spaces. Moreover, several competing definitions for the Poincaré inequality are shown to coincide, if the underlying measure is doubling. One such characterization considers only continuous functions and their continuous upper gradients, and extends work of Heinonen and Koskela. Applications include showing that the p-Poincaré inequality (with a doubling measure), for p ≥ 1, persists through to the limit of a sequence of converging pointed metric measure spaces - this extends results of Cheeger. A further application is the construction of new doubling measures in Euclidean space which admit a 1-Poincaré inequality.

Original languageEnglish
Pages (from-to)255-292
Number of pages38
JournalMathematische Zeitschrift
Volume245
Issue number2
DOIs
Publication statusPublished - Oct 2003
Externally publishedYes

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