Quasiconformal mappings and H\"older continuity
Abstract
We establish that every K-quasiconformal mapping w of the unit ball onto a C2-Jordan domain is H\"older continuous with constant α= 2-np, provided that its weak Laplacean w is in Lp() for some n/2<p<n. In particular it is H\"older continuous for every 0<α<1 provided that w∈ Ln().
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