Bohr inequalities for holomorphic mappings in higher-dimensional complex Banach spaces

Abstract

In this paper, we investigates the Bohr phenomenon for holomorphic mappings F from the unit ball BX of a complex Banach space X into the closure of the unit polydisc Dm within the space Cm. First, we prove an improved Bohr inequality involving the squared norms of the mapping and its homogeneous expansions. Second, we derive a refined Bohr inequality that incorporates a combination of the coefficient norms and their squares. Finally, we obtain a refined Bohr inequality for compositions F , where is a Schwarz mapping with a zero of order k at the origin. For each result, we demonstrate that the derived Bohr radius is sharp.

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