Refined Bohr inequality for functions in Cn and in complex Banach spaces

Abstract

In this paper, we first obtain a refined version of the Bohr inequality of norm-type for holomorphic mappings with lacunary series on the polydisk in Cn under some restricted conditions. Next, we determine the refined version of the Bohr inequality for holomorphic functions defined on a balanced domain G of a complex Banach space X and take values from the unit disk D . Furthermore, as a consequence of one of this results, we obtain a refined version of the Bohr-type inequalities for harmonic functions f=h+g defined on a balanced domain G⊂ X . All the results are proved to be sharp.