MU:MU02023 Functional Analysis I - Course Information
MU02023 Functional Analysis I
Mathematical Institute in OpavaWinter 2019
- Extent and Intensity
- 2/2/0. 6 credit(s). Type of Completion: zk (examination).
- Teacher(s)
- doc. RNDr. Michal Málek, Ph.D. (lecturer)
doc. RNDr. Michaela Mlíchová, Ph.D. (seminar tutor) - Guaranteed by
- RNDr. Jiří Jahn, Ph.D.
Mathematical Institute in Opava - Timetable
- Mon 12:15–13:50 R2
- Timetable of Seminar Groups:
- Prerequisites (in Czech)
- TYP_STUDIA(B)
- Course Enrolment Limitations
- The course is also offered to the students of the fields other than those the course is directly associated with.
- fields of study / plans the course is directly associated with
- Applied Mathematics (programme MU, B1101)
- Applied Mathematics in Risk Management (programme MU, B1101)
- Mathematical Methods in Economics (programme MU, B1101)
- Mathematics (programme MU, B1101)
- Course objectives
- The main attention of the first part of the basic course of functional analysis is given to topological vector spaces, i.e. to the spaces equipped with compatible algebraic and topological structures, to continuous linear mappings of such spaces and to three basic principles of functional analysis: Hahn-Banach theorem, openness principle and boundedness principle.
- Syllabus
- 1. Topological vector spaces (conservation of algebraical properties by topological operations, properties of neighbourhoods of zero in a topological vector space, continuous linear mappings of topological vector spaces).
2. Hahn-Banach theorem (convex sets, convex functions, Jensen inequality, sublinear functions, Minkowski function, Hahn-Banach theorem, locally convex spaces, semi-norms, locally convex topology generated by semi-norms, strict separation theorem).
3. Openness principle (Fréchet spaces, Banach theorem on open mapping, Banach theorem on inverse mapping, theorem on closed graph).
4. Boundedness principle (bounded sets, bounded operators, equicontinuity, equiboudedness and pointwise boundedness, Banach-Steinhaus theorem).
- 1. Topological vector spaces (conservation of algebraical properties by topological operations, properties of neighbourhoods of zero in a topological vector space, continuous linear mappings of topological vector spaces).
- Literature
- Language of instruction
- Czech
- Further Comments
- Study Materials
The course can also be completed outside the examination period.
- Enrolment Statistics (Winter 2019, recent)
- Permalink: https://is.slu.cz/course/sumu/winter2019/MU02023