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Composition operators from weighted Bergman-Privalov spaces to Zygmund type spaces on the unit disk

Stevo Stević, Ajay K. Sharma (2012)

Annales Polonici Mathematici

We characterize the boundedness and compactness of composition operators from weighted Bergman-Privalov spaces to Zygmund type spaces on the unit disk.

Continuity of Nemyckij's operator in Hölder spaces

Pavel Drábek (1975)

Commentationes Mathematicae Universitatis Carolinae

Continuous linear extension operators on spaces of holomorphic functions on closed subgroups of a complex Lie group

Do Duc Thai, Dinh Huy Hoang (1999)

Annales Polonici Mathematici

We show that the restriction operator of the space of holomorphic functions on a complex Lie group to an analytic subset V has a continuous linear right inverse if it is surjective and if V is a finite branched cover over a connected closed subgroup Γ of G. Moreover, we show that if Γ and G are complex Lie groups and V ⊂ Γ × G is an analytic set such that the canonical projection $π_{1} : V \to Γ$ is finite and proper, then $R_{V} : O (Γ \times G) \to I m R_{V} \subset O (V)$ has a right inverse

Displaying 21 – 29 of 29

Composition operators from weighted Bergman-Privalov spaces to Zygmund type spaces on the unit disk

Continuity of Nemyckij's operator in Hölder spaces

Continuous linear extension operators on spaces of holomorphic functions on closed subgroups of a complex Lie group

Continuous mappings of a Banach space into a $c_{0}$ space

Convex Compactness Property in Certain Spaces of Measures.

Convolution of vector-valued distributions: A survey and comparison [Book]

Correction à "Représentation fonctionnelle des espaces vectoriels topologiques"

Correction to "On Malgrange Theorem for Nuclear Holomorphic Functions in Open Balls of a Banach Space".

Criteria for Eberlein Compactness in Spaces of Continuous Functions.

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