Bohr radius for Banach spaces on simply connected domains

Abstract

Let H∞(,X) be the space of bounded analytic functions f(z)=Σn=0∞ xnzn from a proper simply connected domain containing the unit disk D:=\z∈ C:|z|<1\ into a complex Banach space X with fH∞(,X) ≤ 1. Let φ=\φn(r)\n=0∞ with φ0(r)≤ 1 such that Σn=0∞ φn(r) converges locally uniformly with respect to r ∈ [0,1). For 1≤ p,q<∞, we denote equation* Rp,q,φ(f,,X)= \r ≥ 0: x0p φ0(r) + (Σn=1∞ xnφn(r))q ≤ φ0(r)\ equation* and define the Bohr radius associated with φ by Rp,q,φ(,X)=∈f \Rp,q,φ(f,,X): fH∞(,X) ≤ 1\. In this article, we extensively study the Bohr radius Rp,q,φ(,X), when X is an arbitrary Banach space and X is certain Hilbert space. Furthermore, we establish the Bohr inequality for the operator-valued Ces\'aro operator and Bernardi operator.