On the Bohr's inequality for stable mappings
Abstract
We consider the class of stable harmonic mappings f=h+g introduced by Martin, Hernandez, and the class of stable logharmonic mappings f=zhg introduced by AbdulHadi, El-Hajj. We determine Bohr's radius for the classes of stable univalent harmonic mappings, stable convex harmonic mappings and stable univalent logharmonic mappings. We also consider improved and refined versions of Bohr's inequality and discuss the Bohr's Rogonsiski radius for these family of mappings.
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