The Bohr radius for operator valued functions on simply connected domain

Abstract

In this paper, we first establish an improved Bohr inequality for the class of operator-valued holomorphic functions f on a simply connected domain in C. Next, we establish a generalization of refined version of the Bohr inequality and the Bohr-Rogosinski inequality with the help of the sequence =\n(r) \∞n=0 of non-negative continuous functions in [0,1) such that the series Σn=0∞n(r) converges locally uniformly on the interval [0,1). All the results are proved to be sharp. Moreover, We establish the Bohr inequality and the Bohr-Rogosinski inequality for the class of operator-valued -Bloch functions defined in two different simply connected domains, and γ, in C.

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