Riesz and Kolmogorov inequality for harmonic quasiregular mappings

Abstract

Let K 1 and p∈(1,2]. We obtain asymptotically sharp constant c(K,p), when K 1 in the inequality \| f\|p c(K,p)\|(f)\|p where f∈ hp is a K-quasiregular harmonic mapping in the unit disk belonging to the Hardy space hp, under the conditions (f(0))∈ (-π/(2p),π/(2p)) and f(D)(-∞,0)=. The paper improves a recent result by Liu and Zhu in aimzhu. We also extend this result for the quasiregular harmonic mappings in the unit ball in Rn. We also extend Kolmogorov theorem for quasiregular harmonic mappings in the plane.

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