Sammanfattning
Abstract
This thesis consists of the following three papers
Paper I. Hankel operators on Bergman spaces and similarity to contractions.
In this paper we consider Foguel-Hankel operators on vector-valued Bergman spaces. Such operators defined on Hardy spaces play a central role in the famous example by Pisier of a polynomially bounded operator which is not similar to a contraction. On Bergman spaces we encounter a completely different behaviour; power boundedness, polynomial boundedness and similarity to a contraction are all equivalent for this class of operators.
Paper II. Weak product decompositions and Hankel operators on vector-valued Bergman spaces.
We obtain weak product decomposition theorems, which represent the Bergman space analogues to Sarason's theorem for operator-valued Hardy spaces, respectively, to the Ferguson-Lacey theorem for Hardy spaces on product domains. We also characterize the compact Hankel operators on vector-valued Bergman spaces.
Paper III. Discretizations of integral operators and atomic decompositions in vector-valued Bergman spaces.
We prove a general atomic decomposition theorem for weighted vector-valued Bergman spaces, which has applications to duality problems and to the study of compact Toeplitz type operator
This thesis consists of the following three papers
Paper I. Hankel operators on Bergman spaces and similarity to contractions.
In this paper we consider Foguel-Hankel operators on vector-valued Bergman spaces. Such operators defined on Hardy spaces play a central role in the famous example by Pisier of a polynomially bounded operator which is not similar to a contraction. On Bergman spaces we encounter a completely different behaviour; power boundedness, polynomial boundedness and similarity to a contraction are all equivalent for this class of operators.
Paper II. Weak product decompositions and Hankel operators on vector-valued Bergman spaces.
We obtain weak product decomposition theorems, which represent the Bergman space analogues to Sarason's theorem for operator-valued Hardy spaces, respectively, to the Ferguson-Lacey theorem for Hardy spaces on product domains. We also characterize the compact Hankel operators on vector-valued Bergman spaces.
Paper III. Discretizations of integral operators and atomic decompositions in vector-valued Bergman spaces.
We prove a general atomic decomposition theorem for weighted vector-valued Bergman spaces, which has applications to duality problems and to the study of compact Toeplitz type operator
Originalspråk | engelska |
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Kvalifikation | Doktor |
Tilldelande institution |
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Handledare |
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Tilldelningsdatum | 2005 okt. 14 |
Förlag | |
ISBN (tryckt) | 91-628-6625-7 |
Status | Published - 2005 |
Bibliografisk information
Defence detailsDate: 2005-10-14
Time: 10:15
Place: Sölvegatan 18, Sal MH:C
External reviewer(s)
Name: Pott, Sandra
Title: Professor
Affiliation: University of Glasgow
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Ämnesklassifikation (UKÄ)
- Matematik