Functional analysis 2

Code	Completion	Credits	Range	Language
01FAN2	Z,ZK	5	2P+2C	Czech

Garant předmětu:

Pavel Šťovíček

Lecturer:

Pavel Šťovíček

Tutor:

Pavel Šťovíček

Supervisor:

Department of Mathematics

Synopsis:

The course aims to present selected fundamental results from functional analysis including basic theorems of the

theory of Banach spaces, closed operators and their spectrum, Hilbert-Schmidt operators, spectral decomposition

of bounded self-adjoint operators.

Requirements:

Syllabus of lectures:

1. The Baire theorem, the Banach-Steinhaus theorem (the principle of uniform boundedness), the open mapping

theorem, the closed graph theorem.

2. Spectrum of closed operators in Banach spaces, the graph of an operator, analytic properties of a resolvent,

the spectral radius.

3. Compact operators, the Arzela-Ascoli theorem, Hilbert-Schmidt operators.

4. The Weyl criterion for normal operators, properties of spectra of bounded self-adjoint operators.

5, The spectral decomposition of bounded self-adjoint operators, functional calculus.

Syllabus of tutorials:

Study Objective:

Study materials:

Povinná literatura

1. J. Blank, P. Exner, M. Havlíček: Hilbert Space Operators in Quantum Physics, Springer, 2013.

2. B. Simon: Operator Theory: A Comprehensive Course in Analysis, Part 4, AMS, Rhode Island, 2015.

Doporučená literatura

3. W. Rudin: Real and Complex Analysis, (McGrew-Hill, Inc., New York, 1974)

4. A. N. Kolmogorov, S. V. Fomin: Elements of the Theory of Functions and Functional Analysis, (Dover

Publications, 1999)

5. A. E. Taylor: Introduction to Functional Analysis, (John Wiley and Sons, Inc., New York, 1976)

Note:

Time-table for winter semester 2023/2024:

Time-table is not available yet

Time-table for summer semester 2023/2024:

Time-table is not available yet

The course is a part of the following study plans: