Generalized quasiisometry on smooth riemannian manifolds

E. Afanasieva

arXiv:1501.05053·math.CV·January 22, 2015

Generalized quasiisometry on smooth riemannian manifolds

E. Afanasieva

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TL;DR

This paper investigates how finitely Bi-Lipschitz mappings behave at the boundaries of smooth Riemannian manifolds, providing insights into their geometric and analytical properties.

Contribution

It introduces a generalized concept of quasiisometry tailored for smooth Riemannian manifolds and analyzes boundary behavior of these mappings.

Findings

01

Characterization of boundary behavior of finitely Bi-Lipschitz mappings

02

Extension properties of mappings to boundary points

03

Conditions ensuring boundary regularity

Abstract

We study the boundary behavior of finitely Bi-Lipschitz mappings on smooth Riemannian manifolds

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Taxonomy

TopicsGeometric Analysis and Curvature Flows · Analytic and geometric function theory · Geometric and Algebraic Topology