Zygmund theorem for harmonic quasiregular mappings
Abstract
Let K 1. We prove Zygmund theorem for K-quasiregular harmonic mappings in the unit disk D in the complex plane by providing a constant C(K) in the inequality \|f\|1 C(K)(1+\|Re\,(f)+ |Re\, f|\|1), provided that Im\,f(0)=0. Moreover for a quasiregular harmonic mapping f=(f1,…, fn) defined in the unit ball B⊂ Rn, we prove the asymptotically sharp inequality \|f\|1-|f(0)| (n-1)K2(\|f1 f1\|1- f1(0) f1(0)), when K 1, provided that f1 is positive.
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