Add to ORKGAbstract. We demonstrate that the complex plane and a class of generalized Grushin planes G r , where r is a function satisfying specific requirements, are quasisymmetrically equivalent. Then using conjugation we are able to develop an analytic definition of quasisymmetry for homeomorphisms on G r spaces. In the last section we show our analytic definition of quasisymmetry is consistent with earlier notions of conformal mappings on the Grushin plane. This leads to several characterizations of conformal mappings on the generalized Grushin planes
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This volume is a collection of surveys on function theory in euclidean n-dimensional spaces centered...
We establish that the infinitesimal “ H -definition” for quasiconformal mappings on Carnot groups im...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
This book offers a modern, up-to-date introduction to quasiconformal mappings from an explicitly geo...
During the past decade decisive progress has been made in the= eneral theory of quasiconformal mappi...
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...
Abstract. We compare the Grushin geometry to Euclidean geome-try, through quasisymmetric parametriza...
Herbert Grötzsch is the main founder of the theory of quasiconformal mappings. We review five of his...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
This paper is devoted to the study of a fundamental problem in the theory of quasiconformal analysis...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This volume is a collection of surveys on function theory in euclidean n-dimensional spaces centered...
We establish that the infinitesimal “ H -definition” for quasiconformal mappings on Carnot groups im...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
This book offers a modern, up-to-date introduction to quasiconformal mappings from an explicitly geo...
During the past decade decisive progress has been made in the= eneral theory of quasiconformal mappi...
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...
Abstract. We compare the Grushin geometry to Euclidean geome-try, through quasisymmetric parametriza...
Herbert Grötzsch is the main founder of the theory of quasiconformal mappings. We review five of his...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
This paper is devoted to the study of a fundamental problem in the theory of quasiconformal analysis...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
This volume is a collection of surveys on function theory in euclidean n-dimensional spaces centered...
We establish that the infinitesimal “ H -definition” for quasiconformal mappings on Carnot groups im...