A Unified Study of Bohr's Inequality for analytic and harmonic mappings on the Unit Disk
Abstract
We investigate improved forms of the Bohr inequality, using the quantity Sr/π, for analytic selfmaps in class B of D, where Sr is the area measure of Dr. We then generalize the inequality for harmonic mappings (P0H(M) and W0H(α) of the form f = h + g) by introducing a sequence \n(r)\n=0∞ of differentiable, increasing functions on [0, 1). The Hurwitz Lerch Zeta function is utilized for some consequences, and all results are shown to be sharp.
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