Bilateral composition operators on vector-valued Hardy spaces

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Abstract:

Let $T$ be a bounded operator on the Banach space $X$ and $ph$ be an analytic self-map of the unit disk $Bbb{D}$‎. ‎We investigate some operator theoretic properties of‎ ‎bilateral composition operator $C_{ph‎, ‎T}‎: ‎f ri T circ f circ ph$ on the vector-valued Hardy space $H^p(X)$ for $1 leq p leq‎ ‎+infty$.‎ ‎Compactness and weak compactness of $C_{ph‎, ‎T}$ on $H^p(X)$‎ ‎are characterized and when $p=2$‎, ‎a concrete formula for its adjoint is given‎.

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Journal title

volume 40  issue 2

pages  325- 337

publication date 2014-04-01

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