Analytic reproducing kernel Hilbert spaces and their operators
A criterion for boundedness of composition operators acting on the general class of Hilbert spaces of entire Dirichlet series, namely the class $\mathcal{H}(\beta,E)$, was obtained in [15]. Varied results of properties were analysed in earlier papers [22, 13, 2]. In this thesis we extend these resul...
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Nanyang Technological University
2020
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sg-ntu-dr.10356-1389412023-02-28T23:16:24Z Analytic reproducing kernel Hilbert spaces and their operators Mau, Camille Le Hai Khoi School of Physical and Mathematical Sciences University of Lille 1 Emmanuel Fricain lhkhoi@ntu.edu.sg; emmanuel.fricain@univ-lille.fr Science::Mathematics::Analysis A criterion for boundedness of composition operators acting on the general class of Hilbert spaces of entire Dirichlet series, namely the class $\mathcal{H}(\beta,E)$, was obtained in [15]. Varied results of properties were analysed in earlier papers [22, 13, 2]. In this thesis we extend these results to the general setting of spaces of Dirichlet series holomorphic on the half-plane. A complete characterisation of boundedness of polynomial-induced composition operators is found. We then study several properties of these operators, obtaining several characterisations in complex symmetry, compactness, etc. A proof that a system of normalised reproducing kernels $(\widetilde{k_{\lambda_n}})$ is never a frame for the Hardy space $H^2$ is also analysed. A generalisation of the method was made to determine classes of spaces and sequences $(\widetilde{k_{\lambda_n}})$ which do not constitute frames for their parent spaces. Bachelor of Science in Mathematical Sciences 2020-05-14T04:24:14Z 2020-05-14T04:24:14Z 2020 Final Year Project (FYP) https://hdl.handle.net/10356/138941 en application/pdf Nanyang Technological University |
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Science::Mathematics::Analysis Mau, Camille Analytic reproducing kernel Hilbert spaces and their operators |
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A criterion for boundedness of composition operators acting on the general class of Hilbert spaces of entire Dirichlet series, namely the class $\mathcal{H}(\beta,E)$, was obtained in [15]. Varied results of properties were analysed in earlier papers [22, 13, 2]. In this thesis we extend these results to the general setting of spaces of Dirichlet series holomorphic on the half-plane. A complete characterisation of boundedness of polynomial-induced composition operators is found. We then study several properties of these operators, obtaining several characterisations in complex symmetry, compactness, etc. A proof that a system of normalised reproducing kernels $(\widetilde{k_{\lambda_n}})$ is never a frame for the Hardy space $H^2$ is also analysed. A generalisation of the method was made to determine classes of spaces and sequences $(\widetilde{k_{\lambda_n}})$ which do not constitute frames for their parent spaces. |
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Le Hai Khoi |
| author_facet |
Le Hai Khoi Mau, Camille |
| format |
Final Year Project |
| author |
Mau, Camille |
| author_sort |
Mau, Camille |
| title |
Analytic reproducing kernel Hilbert spaces and their operators |
| title_short |
Analytic reproducing kernel Hilbert spaces and their operators |
| title_full |
Analytic reproducing kernel Hilbert spaces and their operators |
| title_fullStr |
Analytic reproducing kernel Hilbert spaces and their operators |
| title_full_unstemmed |
Analytic reproducing kernel Hilbert spaces and their operators |
| title_sort |
analytic reproducing kernel hilbert spaces and their operators |
| publisher |
Nanyang Technological University |
| publishDate |
2020 |
| url |
https://hdl.handle.net/10356/138941 |
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1759856435912507392 |