Estimates for the dilatation of σ-harmonic mappings
Abstract
We consider planar σ-harmonic mappings, that is mappings U whose components u1 and u2 solve a divergence structure elliptic equation div (σ ∇ ui)=0, for i=1,2. We investigate whether a locally invertible σ-harmonic mapping U is also quasiconformal. Under mild regularity assumptions, only involving σ and the antisymmetric part of σ, we prove quantitative bounds which imply quasiconformality.
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