dc.contributor
Universitat de Barcelona. Departament de Matemàtiques i Informàtica
dc.contributor.author
Arroussi, Hicham
dc.date.accessioned
2016-10-05T11:11:44Z
dc.date.available
2016-10-05T11:11:44Z
dc.date.issued
2016-05-06
dc.identifier.uri
http://hdl.handle.net/10803/395175
dc.description.abstract
The theory of Bergman spaces has been a central subject of study in complex analysis during the past decades. The book [7] by S. Bergman contains the first systematic treat-ment of the Hilbert space of square integrable analytic functions with respect to Lebesgue area measure on a domain. His approach was based on a reproducing kernel that became known as the Bergman kernel function. When attention was later directed to the spaces AP over the unit disk, it was natural to call them Bergman spaces. As counterparts of Hardy spaces, they presented analogous problems. However, although many problems in Hardy spaces were well understood by the 1970s, their counterparts for Bergman spaces were generally viewed as intractable, and only some isolated progress was done. The 1980s saw the emerging of operator theoretic studies related to Bergman spaces with important contributions by several authors. Their achievements on Bergman spaces with standard weights are presented in Zhu's book [77]. The main breakthroughs came in the 1990s, where in a flurry of important advances, problems previously considered intractable began to be solved. First came Hedenmalm's construction of canonical divisors [26], then Seip's description [59] of sampling and interpolating sequences on Bergman spaces, and later on, the study of Aleman, Richter and Sundberg [1] on the invariant subspaces of A2, among others. This attracted other workers to the field and inspired a period of intense research on Bergman spaces and related topics. Nowadays there are rich theories on Bergman spaces that can be found on the textbooks [27] and [22].
Meanwhile, also in the nineties, some isolated problems on Bergman spaces with ex-ponential type weights began to be studied. These spaces are large in the sense that they contain all the Bergman spaces with standard weights, and their study presented new dif-ficulties, as the techniques and ideas that led to success when working on the analogous problems for standard Bergman spaces, failed to work on that context. It is the main goal of this work to do a deep study of the function theoretic properties of such spaces, as well as of some operators acting on them. It turns out that large Bergman spaces are close in spirit to Fock spaces [79], and many times mixing classical techniques from both Bergman and Fock spaces in an appropriate way, can led to some success when studying large Bergman spaces.
en_US
dc.format.extent
117 p.
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dc.format.mimetype
application/pdf
dc.language.iso
eng
en_US
dc.publisher
Universitat de Barcelona
dc.rights.license
L'accés als continguts d'aquesta tesi queda condicionat a l'acceptació de les condicions d'ús establertes per la següent llicència Creative Commons: http://creativecommons.org/licenses/by/4.0/
dc.rights.uri
http://creativecommons.org/licenses/by/4.0/
*
dc.source
TDX (Tesis Doctorals en Xarxa)
dc.subject
Funcions analítiques
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dc.subject
Funciones analíticas
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dc.subject
Analytic functions
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dc.subject
Funcions holomorfes
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dc.subject
Funciones holomorfas
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dc.subject
Holomorphic functions
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dc.subject
Operadors de Toeplitz
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dc.subject
Operadores de Toeplitz
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dc.subject
Toeplitz operators
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dc.subject
Equacions funcionals
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dc.subject
Ecuaciones funcionales
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dc.subject
Functional equations
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dc.subject
Nuclis de Bergman
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dc.subject
Núcleos de Bergman
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dc.subject
Bergman kernel functions
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dc.subject.other
Ciències Experimentals i Matemàtiques
cat
dc.title
Function and Operator Theory on Large Bergman spaces
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dc.type
info:eu-repo/semantics/doctoralThesis
dc.type
info:eu-repo/semantics/publishedVersion
dc.contributor.director
Pau, Jordi
dc.contributor.tutor
Ortega Cerdà, Joaquim
dc.embargo.terms
cap
en_US
dc.rights.accessLevel
info:eu-repo/semantics/openAccess