An asymptotically sharp coefficients estimate for harmonic K-quasiconformal mappings

An asymptotically sharp coefficients estimate for harmonic K-quasiconformal mappings

Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp lower bound estimate for the coefficients of harmonic K-quasiconformal self-mappings of the unit disk D ${\mathbb{D}}$ which keep the origin fixed. The result partly improves the former results given...

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Bibliographic Details
Main Author: Hong-Ping Li
Format: Article
Language:English
Published: SpringerOpen 2016-03-01
Series:Journal of Inequalities and Applications
Subjects:
Heinz inequality
Hübner inequalities
coefficients estimate
harmonic quasiconformal mapping
Online Access:http://link.springer.com/article/10.1186/s13660-016-1033-0
Description
Summary:Abstract By using the improved Hübner inequalities, in this paper we obtain an asymptotically sharp lower bound estimate for the coefficients of harmonic K-quasiconformal self-mappings of the unit disk D ${\mathbb{D}}$ which keep the origin fixed. The result partly improves the former results given by (Partyka and Sakan in Ann. Acad. Sci. Fenn., Math. 30:167-182, 2005) and (Zhu and Zeng in J. Comput. Anal. Appl. 13:1081-1087, 2011). Furthermore, using some estimate for the derivative of the boundary function of a harmonic K-quasiconformal self-mapping w of D ${\mathbb{D}}$ which keeps the origin fixed, we obtain an upper bound estimate for the coefficients of w.
ISSN:1029-242X

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