Refined geometric characterizations of weak p-quasiconformal mappings
Abstract
In this paper we consider refined geometric characterizations of weak p-quasiconformal mappings :, where and are domains in Rn. We prove that mappings with the bounded on the set S, where a set S has σ-finite (n-1)-measure, geometric p-dilatation, are W1p,-- mappings and generate bounded composition operators on Sobolev spaces.
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