Bohr and Rogosinski inequalities for operator valued holomorphic functions

Abstract

For any complex Banach space X and each p ∈ [1,∞), we introduce the p-Bohr radius of order N(∈ N) is Rp,N(X) defined by Rp,N(X)= \r≥ 0: Σk=0Nxkp rpk ≤ fpH∞(D, X)\, where f(z)=Σk=0∞ xkzk ∈ H∞(D, X). Here D= \z∈ C: |z| <1\ denotes the unit disk. We also introduce the following geometric notion of p-uniformly C-convexity of order N for a complex Banach space X for some N ∈ N. In this paper, for p∈ [2,∞) and each N ∈ N, we prove that a complex Banach space X is p-uniformly C-convex of order N if, and only if, the p-Bohr radius of order N Rp,N(X)>0. We also study the p-Bohr radius of order N for the Lebesgue spaces Lq (μ) for 1≤ p<q<∞ or 1≤ q ≤ p <2. Finally, we prove an operator valued analogue of a refined version of Bohr and Rogosinski inequality for bounded holomorphic functions from the unit disk D into B(H), where B(H) denotes the space of all bounded linear operator on a complex Hilbert space H.