H\"older Continuity and Differentiability Almost Everywhere of (K1, K2)-Quasiregular Mappings
Abstract
This paper deals with (K1, K2)-quasiregular mappings. It is shown, by Morrey's Lemma and isoperimetric inequality, that every (K1, K2)-quasiregular mapping satisfies a H\"older condition with exponent α on compact subsets of its domain, where align α=cases 1/K1, & for K1>1, \\ any positive number less than 1, & for K1=1 and K2>0, \\ 1, & for K1=1 and K2=0, \\ 1, & for K1<1,\\ cases align Differentiability almost everywhere of (K1, K2)-quasiregular mappings is also derived.
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