Add to ORKGWe consider planar $\sigma$-harmonic mappings, that is mappings $U$ whose components $u^1$ and $u^2$ solve a divergence structure elliptic equation ${\rm div} (\sigma \nabla u^i)=0$, for $i=1,2$. We investigate whether a locally invertible $ \sigma$-harmonic mapping $U$ is also quasiconformal. Under mild regularity assumptions, only involving $\det \sigma$ and the antisymmetric part of $\sigma$, we prove quantitative bounds which imply quasiconformality
In this thesis we are concerned with estimating the regularity of ${\cal A}$-harmonic differential f...
Let g : M → N be a quasiconformal harmonic diffeomorphism between noncompact Riemann surfaces M and ...
We consider sigma-harmonic mappings, that is mappings U whose components u_i solve a divergence stru...
We extend a classical theorem by H. Lewy to planar\sigma-{harmonic mappings, that is mappings U whos...
Suppose that h is a harmonic mapping of the unit disc onto a C1, α domain D. We give sufficient and ...
Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp ...
Given a two-dimensional mapping U whose components solve a divergence structure elliptic equation,we...
K-quasiconformal mappings of Riemann surfaces was investigated by P.J. Kiernan in [2]. One of his in...
We consider mappings U=(u1,u2), whose components solve an arbitrary elliptic equation in divergence ...
AbstractIn this note we show that a harmonic quasiconformal mapping f=u+iv with respect to the Poinc...
In this paper, we assume that \(G\) and \(\Omega\) are two Jordan domains in \(\mathbb{R}^n\) with \...
AbstractWe prove versions of the Ahlfors–Schwarz lemma for quasiconformal euclidean harmonic functio...
Let {f(n) : D --> D} be a sequence of locally quasiconformal harmonic maps on the unit disk D wit...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Regularity problems of a plane quasiconformal mapping f where complex dilatation is close to zero ar...
In this thesis we are concerned with estimating the regularity of ${\cal A}$-harmonic differential f...
Let g : M → N be a quasiconformal harmonic diffeomorphism between noncompact Riemann surfaces M and ...
We consider sigma-harmonic mappings, that is mappings U whose components u_i solve a divergence stru...
We extend a classical theorem by H. Lewy to planar\sigma-{harmonic mappings, that is mappings U whos...
Suppose that h is a harmonic mapping of the unit disc onto a C1, α domain D. We give sufficient and ...
Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp ...
Given a two-dimensional mapping U whose components solve a divergence structure elliptic equation,we...
K-quasiconformal mappings of Riemann surfaces was investigated by P.J. Kiernan in [2]. One of his in...
We consider mappings U=(u1,u2), whose components solve an arbitrary elliptic equation in divergence ...
AbstractIn this note we show that a harmonic quasiconformal mapping f=u+iv with respect to the Poinc...
In this paper, we assume that \(G\) and \(\Omega\) are two Jordan domains in \(\mathbb{R}^n\) with \...
AbstractWe prove versions of the Ahlfors–Schwarz lemma for quasiconformal euclidean harmonic functio...
Let {f(n) : D --> D} be a sequence of locally quasiconformal harmonic maps on the unit disk D wit...
This thesis discusses three different projects concerning quasiconformal mappings on planar surfaces...
Regularity problems of a plane quasiconformal mapping f where complex dilatation is close to zero ar...
In this thesis we are concerned with estimating the regularity of ${\cal A}$-harmonic differential f...
Let g : M → N be a quasiconformal harmonic diffeomorphism between noncompact Riemann surfaces M and ...
We consider sigma-harmonic mappings, that is mappings U whose components u_i solve a divergence stru...