 On a Class of Composition Operators on Bergman SpaceNamita Das, R. P. Lal and C. K. Mohapatra International Journal of Mathematics and Mathematical Sciences, 2007, vol. 2007, 1-11 Abstract: Let 𝔻 = { z ∈ â„‚ : | z | < 1 } be the open unit disk in the complex plane â„‚ . Let A 2 ( 𝔻 ) be the space of analytic functions on 𝔻 square integrable with respect to the measure d A ( z ) = ( 1 / Ï€ ) d x  d y . Given a ∈ 𝔻 and f any measurable function on 𝔻 , we define the function C a f by C a f ( z ) = f ( Ï• a ( z ) ) , where Ï• a ∈ A u t ( 𝔻 ) . The map C a is a composition operator on L 2 ( 𝔻 , d A ) and A 2 ( 𝔻 ) for all a ∈ 𝔻 . Let â„’ ( A 2 ( 𝔻 ) ) be the space of all bounded linear operators from A 2 ( 𝔻 ) into itself. In this article, we have shown that C a S C a = S for all a ∈ 𝔻 if and only if ∫ 𝔻 S Ëœ ( Ï• a ( z ) ) d A ( a ) = S Ëœ ( z ) , where S ∈ â„’ ( A 2 ( 𝔻 ) ) and S Ëœ is the Berezin symbol of S. Date: 2007 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jijmms:039819 DOI: 10.1155/2007/39819 Access Statistics for this article More articles in International Journal of Mathematics and Mathematical Sciences from Hindawi |
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