The Bohr inequality on a simply connected domain and its applications
Abstract
In this article, we first establish a generalized Bohr inequality and examine its sharpness for a class of analytic functions f in a simply connected domain γ, where 0≤ γ<1 with a sequence \n(r) \∞n=0 of non-negative continuous functions defined on [0,1) such that the series Σn=0∞n(r) converges locally uniformly on [0,1). Our results represent twofold generalizations corresponding to those obtained for the classes B(D) and B(γ), where align* γ:=\z∈ C: |z+γ1-γ|<11-γ\. align* As a convolution counterpart, we determine the Bohr radius for hypergeometric function on γ . Lastly, we establish a generalized Bohr inequality and its sharpness for the class of K -quasiconformal, sense-preserving harmonic maps of the form f=h+g in γ.
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