Add to ORKGQuasiconformal mappings in space are known to have many rigidity proper-ties. For instance, 1.1. Theorem (Martio-Sarvas, [MS, 3.17]). Let D C E " , n 2 3, be
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Abstract. We investigate geometric conditions related to Hölder imbeddings, and show, among other t...
This book offers a modern, up-to-date introduction to quasiconformal mappings from an explicitly geo...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
This volume is a collection of surveys on function theory in euclidean n-dimensional spaces centered...
This paper gives an exposition of basic analytical properties of quasiconformal (and quasiregular) m...
During the past decade decisive progress has been made in the= eneral theory of quasiconformal mappi...
The purpose of this paper is to study the linear local connectivity of sets in Euclidean n-space in ...
In this thesis, we examine quasiconformal mappings in Rn. We begin by proving basic properties of th...
In this thesis, we examine quasiconformal mappings in Rn. We begin by proving basic properties of th...
We study metric spaces defined via a conformal weight, or more generally a measurable Finsler struct...
We study metric spaces defined via a conformal weight, or more generally a measurable Finsler struct...
We provide a geometric rigidity estimate a ̀ la Friesecke-James-Müller for conformal matrices. Name...
Mathematicians have been interested in the rigidity of frameworks since Euler’s conjecture in 1776 t...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Abstract. We investigate geometric conditions related to Hölder imbeddings, and show, among other t...
This book offers a modern, up-to-date introduction to quasiconformal mappings from an explicitly geo...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
This volume is a collection of surveys on function theory in euclidean n-dimensional spaces centered...
This paper gives an exposition of basic analytical properties of quasiconformal (and quasiregular) m...
During the past decade decisive progress has been made in the= eneral theory of quasiconformal mappi...
The purpose of this paper is to study the linear local connectivity of sets in Euclidean n-space in ...
In this thesis, we examine quasiconformal mappings in Rn. We begin by proving basic properties of th...
In this thesis, we examine quasiconformal mappings in Rn. We begin by proving basic properties of th...
We study metric spaces defined via a conformal weight, or more generally a measurable Finsler struct...
We study metric spaces defined via a conformal weight, or more generally a measurable Finsler struct...
We provide a geometric rigidity estimate a ̀ la Friesecke-James-Müller for conformal matrices. Name...
Mathematicians have been interested in the rigidity of frameworks since Euler’s conjecture in 1776 t...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Abstract. We investigate geometric conditions related to Hölder imbeddings, and show, among other t...