Michael Struwe: Catalogue data in Autumn Semester 2016

Award: The Golden Owl
Name Prof. em. Dr. Michael Struwe
FieldMathematik
Address
Dep. Mathematik
ETH Zürich, HG G 50.1
Rämistrasse 101
8092 Zürich
SWITZERLAND
Telephone+41 44 633 81 48
Fax+41 44 632 14 74
E-mailmichael.struwe@math.ethz.ch
URLhttp://www.math.ethz.ch/~struwe
DepartmentMathematics
RelationshipProfessor emeritus

NumberTitleECTSHoursLecturers
401-3461-00LFunctional Analysis I
This course counts as a core course in the Bachelor's degree programme in Mathematics. Holders of an ETH Zurich Bachelor's degree in Mathematics who didn't use credits from neither 401-3461-00L Functional Analysis I nor 401-3462-00L Functional Analysis II for their Bachelor's degree still can have recognised this course for the Master's degree.
Furthermore, at most one of the three course units
401-3461-00L Functional Analysis I
401-3531-00L Differential Geometry I
401-3601-00L Probability Theory
can be recognised for the Master's degree in Mathematics or Applied Mathematics.
10 credits4V + 1UM. Struwe
AbstractBaire category; Banach and Hilbert spaces, bounded linear operators; three fundamental principles: Uniform boundedness, open mapping/closed graph theorem, Hahn-Banach; convexity; dual spaces; weak and weak* topologies; Banach-Alaoglu; reflexive spaces; compact operators and Fredholm theory; closed range theorem; spectral theory of self-adjoint operators in Hilbert spaces.
Objective
Lecture notesLecture Notes on "Funktionalanalysis I" by Michael Struwe
401-5350-00LAnalysis Seminar Information 0 credits1KM. Struwe, A. Carlotto, D. Christodoulou, F. Da Lio, A. Figalli, N. Hungerbühler, T. Ilmanen, T. Kappeler, T. Rivière, D. A. Salamon
AbstractResearch colloquium
Objective
406-3461-AALFunctional Analysis I
Enrolment ONLY for MSc students with a decree declaring this course unit as an additional admission requirement.

Any other students (e.g. incoming exchange students, doctoral students) CANNOT enrol for this course unit.
10 credits21RM. Struwe
AbstractBaire category; Banach spaces and linear operators; Fundamental theorems: Open Mapping Theorem, Closed Range Theorem, Uniform Boundedness Principle, Hahn-Banach Theorem; Convexity; reflexive spaces; Spectral theory.
Objective
Lecture notesLecture notes by Professor Michael Struwe (http://www.math.ethz.ch/~struwe/Skripten/FA-I-II-26-8-08.pdf)
or Lecture notes by Prof. Einsiedler and Ward
(https://dl.dropboxusercontent.com/u/2098511/FAnotes.pdf)
LiteratureNumerous texts in English or German