Composition Operators from Nevanlinna Type Spaces to Bloch Type Spaces
نویسنده
چکیده
Let X and Y be complete metric spaces of analytic functions over the unit disk in the complex plane. A linear operator T : X → Y is a bounded operator with respect to metric balls if T takes every metric ball in X into a metric ball in Y . We also say that T is metrically compact if it takes every metric ball in X into a relatively compact subset in Y . In this paper we will consider these properties for composition operators from Nevanlinna type spaces to Bloch type spaces.
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