Bohr radius for invariant families of bounded analytic functions and certain Integral transforms
Abstract
In this paper, we first obtain a refined Bohr radius for invariant families of bounded analytic functions on unit disk D . Then, we obtain Bohr inequality for certain integral transforms, namely Fourier (discrete) and Laplace (discrete) transforms of bounded analytic functions f(z)=Σn=0∞anzn , in a simply connected domain align* γ=\z∈C: |z+γ1-γ|<11-γ\;for\; 0≤ γ<1\, align* where 0=D . These results generalize some existing results. We also show that a better estimate can be obtained in radius and inequality can be shown sharp for Laplace transform of f .
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