Quantitative Sobolev regularity of quasiregular maps

Abstract

We quantify the Sobolev space norm of the Beltrami resolvent (I- μ B)-1, where B is the Beurling-Ahlfors transform, in terms of the corresponding Sobolev space norm of the dilatation μ in the critical and supercritical ranges. Our estimate entails as a consequence quantitative self-improvement inequalities of Caccioppoli type for quasiregular distributions with dilatations in W1,p, p ≥ 2. Our proof strategy is then adapted to yield quantitative estimates for the resolvent (I-μ B)-1 of the Beltrami equation on a sufficiently regular domain , with μ∈ W1,p(). Here, B is the compression of B to a domain . Our proofs do not rely on the compactness or commutator arguments previously employed in related literature. Instead, they leverage the weighted Sobolev estimates for compressions of Calder\'on-Zygmund operators to domains, recently obtained by the authors, to extend the Astala-Iwaniec-Saksman technique to higher regularities.

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