Add to ORKGEstimate of hyperbolically partial derivatives of ρ-harmonic quasiconformal mappings and its applications
We show that quasiconformal harmonic mappings on the proper domains in R2 are bi-Lipschitz with resp...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
In the present paper the direct theorem on approximation of classes of harmonic functions with singu...
We study the class of -harmonic -quasiconformal mappings with angular ranges. After building a diffe...
The book presents a research area in geometric function theory concerned with harmonic quasiconforma...
We obtain a sharp estimate of the derivatives of harmonic quasiconformal extension u = P [φ] of a Li...
AbstractWe prove versions of the Ahlfors–Schwarz lemma for quasiconformal euclidean harmonic functio...
Suppose that h is a harmonic mapping of the unit disc onto a C1, α domain D. We give sufficient and ...
We consider planar $\sigma$-harmonic mappings, that is mappings $U$ whose components $u^1$ and $u^2$...
For any multiply connected domain Omega in R(2), let S be the boundary of the convex hull in H(3) of...
Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp ...
We give a new glance to the theorem of Wan (Theorem 1.1) which is related to the hyperbolic bi-Lipsc...
Different aspects of the boundary value problem for quasiconformal mappings and Teichmüller spaces a...
In this paper, we assume that \(G\) and \(\Omega\) are two Jordan domains in \(\mathbb{R}^n\) with \...
This text is a concise introduction to the partial differential equations which change from elliptic...
We show that quasiconformal harmonic mappings on the proper domains in R2 are bi-Lipschitz with resp...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
In the present paper the direct theorem on approximation of classes of harmonic functions with singu...
We study the class of -harmonic -quasiconformal mappings with angular ranges. After building a diffe...
The book presents a research area in geometric function theory concerned with harmonic quasiconforma...
We obtain a sharp estimate of the derivatives of harmonic quasiconformal extension u = P [φ] of a Li...
AbstractWe prove versions of the Ahlfors–Schwarz lemma for quasiconformal euclidean harmonic functio...
Suppose that h is a harmonic mapping of the unit disc onto a C1, α domain D. We give sufficient and ...
We consider planar $\sigma$-harmonic mappings, that is mappings $U$ whose components $u^1$ and $u^2$...
For any multiply connected domain Omega in R(2), let S be the boundary of the convex hull in H(3) of...
Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp ...
We give a new glance to the theorem of Wan (Theorem 1.1) which is related to the hyperbolic bi-Lipsc...
Different aspects of the boundary value problem for quasiconformal mappings and Teichmüller spaces a...
In this paper, we assume that \(G\) and \(\Omega\) are two Jordan domains in \(\mathbb{R}^n\) with \...
This text is a concise introduction to the partial differential equations which change from elliptic...
We show that quasiconformal harmonic mappings on the proper domains in R2 are bi-Lipschitz with resp...
International audienceIn this chapter, we first give a brief overview of the classical theory of qua...
In the present paper the direct theorem on approximation of classes of harmonic functions with singu...