Generalized Bohr inequalities for K-quasiconformal harmonic mappings and their applications
Abstract
The classical Bohr theorem and its subsequent generalizations have become active areas of research, with investigations conducted in numerous function spaces. Let \n(r)\n=0∞ be a sequence of non-negative continuous functions defined on [0,1) such that the series Σn=0∞ n(r) converges locally uniformly on the interval [0, 1). The main objective of this paper is to establish several sharp versions of generalized Bohr inequalities for the class of K-quasiconformal sense-preserving harmonic mappings on the unit disk := \z ∈ C : |z| < 1\. To achieve these, we employ the sequence of functions \n(r)\n=0∞ in the majorant series rather than the conventional dependence on the basis sequence \rn\n=0∞. As applications, we derive a number of previously published results as well as a number of sharply improved and refined Bohr inequalities for harmonic mappings in . Moreover, we obtain a convolution counterpart of the Bohr theorem for harmonic mapping within the context of the Gaussian hypergeometric function
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