## Functional Analysis

- The aim of this course is to give a very modest introduction to the extremely rich and well-developed theory of Hilbert spaces, an introduction that hopefully will provide the students with a knowledge of some of the fundamental results of the theory and will make them familiar with everything needed in order to understand, believe and apply the spectral theorem for selfadjoint operators in Hilbert space. This implies that the course will have to give answers to such questions as - What is a Hilbert space? - What is a bounded operator in Hilbert space? - What is a selfadjoint operator in Hilbert space? - What is the spectrum of such an operator? - What is meant by a spectral decomposition of such an operator?

Author: | Bernd Rosenberger |
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URN (permanent link): | urn:nbn:de:hbz:386-kluedo-8363 |

Document Type: | Lecture |

Language of publication: | English |

Year of Completion: | 1998 |

Year of Publication: | 1998 |

Publishing Institute: | Technische Universität Kaiserslautern |

Tag: | Funktionalanalysis ; Vorlesungsskript |

Faculties / Organisational entities: | Fachbereich Mathematik |

DDC-Cassification: | 510 Mathematik |

MSC-Classification (mathematics): | 46-XX FUNCTIONAL ANALYSIS (For manifolds modeled on topological linear spaces, see 57Nxx, 58Bxx) |