Norm of the Hilbert matrix operator between some spaces of analytic functions
Abstract
In this paper, we calculate the exact value of the norm of the Hilbert matrix operator H from the logarithmically weighted Korenblum space H∞α, into Korenblum space H∞α, and from the Hardy space H∞ to the classical Bloch space B. Furthermore, we compute the precise value of the norm on the logarithmically weighted Korenblum space H∞α,, and obtain both the lower and upper bounds of the norm on α-Bloch space Bα. Finally, in the context of mapping from the Korenblum space H∞α to the (α+1)-Bloch space Bα+1, we establish the norm of H.
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