Beltrami equations with coefficient in the Sobolev space W1,p

We study the removable singularities for solutions to the Beltrami equation ∂f = µ ∂f, where µ is a bounded function, kµk∞ ≤ K-1 K+1 < 1, and such that µ ∈ W1,p for some p ≤ 2. Our results are based on an extended version of the well known Weyl's lemma, asserting that distributional solution...

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Bibliographic Details
Authors: Clop, Albert|||0000-0002-0187-6288, Faraco, Daniel|||0000-0001-7860-9500, Mateu Bennassar, Joan|||0000-0001-7616-6865, Orobitg i Huguet, Joan|||0000-0001-5949-0890, Zhong, Xiao
Format: article
Publication Date:2009
Country:España
Institution:Universitat Autònoma de Barcelona
Repository:Dipòsit Digital de Documents de la UAB
Language:English
OAI Identifier:oai:ddd.uab.cat:49631
Online Access:https://ddd.uab.cat/record/49631
https://dx.doi.org/urn:doi:10.5565/PUBLMAT_53109_09
Access Level:Open access
Keyword:Quasiconformal
Hausdorff measure
Removability
Description
Summary:We study the removable singularities for solutions to the Beltrami equation ∂f = µ ∂f, where µ is a bounded function, kµk∞ ≤ K-1 K+1 < 1, and such that µ ∈ W1,p for some p ≤ 2. Our results are based on an extended version of the well known Weyl's lemma, asserting that distributional solutions are actually true solutions. Our main result is that quasiconformal mappings with compactly supported Beltrami coefficient µ ∈ W1,p, 2K2 K2+1 < p ≤ 2, preserve compact sets of σ-finite length and vanishing analytic capacity, even though they need not be bilipschitz.