Details
Course Description:
The subject of Functional Analysis originated in the study of integral/differential equations and, more generally, equations involving operators on infinite dimensional spaces. These techniques can be helpful, for instance, in analysing convergence series and can be used to make sense of "eigenvalues" and "determinants" for infinite-dimensional matrices. Functional Analysis has found broad applicability in diverse areas of Mathematics, Physics, Economics, and other sciences. Students will be introduced to the theory of Banach and Hilbert spaces. We will discuss such fundamental theorems of the Functional Analysis as Hahn-Banach Theorem, Uniform Boundedness Theorem, Open Mapping Theorem, Closed Graph Theorem, etc. and develop the Spectral Theory of linear operators.
Exercise class:
Monday, 3-4:45pm. Raum: Y27H28. Assistent: François Ged .
Question hour:
Tuesday, 5-6pm or by appointment. Raum: Y27K52. Assistent: Ofir David .
Prüfung:
Modul: written; Repetition: oral
The condition to be admitted to the exam is to earn at least 50% of the points for the homework problems.
References:
- J. Conway, A Course in Functional Analysis, Springer, 1994.
- D. Lax, Functional Analysis, Wiley Interscience, New York, 2002.
- M. Reed and B. Simon, Methods of modern mathematical physics, Volume 1: Functional analysis, Academic Press, 1981.
- W. Rudin, Functional Analysis, McGraw-Hill, 1991.
- R. Zimmer, Essential Results in Functional Analysis, University of Chicago Press, 1990.
Prüfung
Prüfung
Modul: 07.02.2019 9:00-12:00, Raum: Y27H12 Plätze: 50, Typ: schriftlich
Repetition: 12.09.2019 9:00-17:00, Raum: Y27K22 Plätze: 1, Typ: mündlich
