A note on precised Hardy inequalities on Carnot groups and Riemannian   manifolds

Emmanuel Russ (LATP); Yannick Sire (LATP)

arXiv:1003.5063·math.FA·April 8, 2010

A note on precised Hardy inequalities on Carnot groups and Riemannian manifolds

Emmanuel Russ (LATP), Yannick Sire (LATP)

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TL;DR

This paper establishes non-local Hardy inequalities on Carnot groups and Riemannian manifolds using integral representations of fractional Sobolev norms, expanding the understanding of inequalities in geometric analysis.

Contribution

It introduces new non-local Hardy inequalities applicable to Carnot groups and Riemannian manifolds, utilizing fractional Sobolev norm representations.

Findings

01

Proved non-local Hardy inequalities on Carnot groups.

02

Extended Hardy inequalities to Riemannian manifolds.

03

Utilized integral representations of fractional Sobolev norms.

Abstract

We prove non local Hardy inequalities on Carnot groups and Riemannian manifolds, relying on integral representations of fractional Sobolev norms.

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Taxonomy

TopicsNonlinear Partial Differential Equations · Advanced Harmonic Analysis Research · Geometric Analysis and Curvature Flows