dc.contributor.author Kaptanğlu, H. T. en_US dc.contributor.author Tülü, S. en_US dc.date.accessioned 2016-02-08T09:54:40Z dc.date.available 2016-02-08T09:54:40Z dc.date.issued 2011 en_US dc.identifier.issn 1027-5487 dc.identifier.uri http://hdl.handle.net/11693/22044 dc.description.abstract We determine precise conditions for the boundedness of Bergman projections from Lebesgue classes onto the spaces in the title, which are members of the same one-parameter family of spaces. The projections provide integral representations for the functions in the spaces. We obtain many properties of the spaces as straightforward corollaries of the projections, integral representations, and isometries among the spaces. We solve the Gleason problem and an extremal problem for point evaluations in each space. We establish maximality of these spaces among those that exhibit M̈obius-type invariances and possess decent functionals. We find new Hermitian non-K̈ahlerian metrics that characterize half of these spaces by Lipschitz-type inequalities. en_US dc.language.iso English en_US dc.source.title Taiwanese Journal of Mathematics en_US dc.title Weighted Bloch, Lipschitz, Zygmund, Bers, and growth spaces of the ball: Bergman projections and characterizations en_US dc.type Article en_US dc.department Department of Mathematics en_US dc.citation.spage 101 en_US dc.citation.epage 127 en_US dc.citation.volumeNumber 15 en_US dc.citation.issueNumber 1 en_US dc.publisher Mathematical Society of the Republic of China,Zhonghua Minguo Shuxuehui en_US dc.identifier.eissn 2224-6851
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