Norm of the Hilbert matrix operator on logarithmically weighted Bloch and Hardy spaces

Abstract

In this paper, we compute the exact value of the norm of the Hilbert matrix operator H acting from the classical Bloch space B into the logarithmically weighted Bloch space B, and show that it equals 32; we also find that the norm from the space of bounded analytic functions H∞ into the logarithmically weighted Hardy space H∞ is 1. Furthermore, we establish both lower and upper bounds for the norm of H when it maps from the α-Bloch space Bα into the logarithmically weighted Bα with 1 <α < 2, and from the Hardy space H1 into the logarithmically weighted Hardy space H1.

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