Composition-Differentiation Operator on Weighted Bergman Spaces
Abstract
In this paper, we study the complex symmetry of weighted composition-differentiation operator Dn, , φ on weighted Bergman spaces A2α with respect to the conjugation Cμ, η for μ, η ∈ \z∈ C:|z|=1\. We obtain explicit conditions for which the operator Dn, , φ is Hermitian and normal. We also characterize the complex symmetric weighted composition-differentiation operator for derivative Hardy spaces.
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