250060 VO Functional analysis 2 (2009S)
Labels
Details
Language: German
Examination dates
Lecturers
Classes (iCal) - next class is marked with N
Wednesday
04.03.
10:00 - 11:30
Seminarraum
Thursday
05.03.
10:20 - 11:05
Seminarraum
Wednesday
11.03.
10:00 - 11:30
Seminarraum
Wednesday
18.03.
10:00 - 11:30
Seminarraum
Thursday
19.03.
10:20 - 11:05
Seminarraum
Wednesday
25.03.
10:00 - 11:30
Seminarraum
Thursday
26.03.
10:20 - 11:05
Seminarraum
Wednesday
01.04.
10:00 - 11:30
Seminarraum
Thursday
02.04.
10:20 - 11:05
Seminarraum
Wednesday
22.04.
10:00 - 11:30
Seminarraum
Thursday
23.04.
10:20 - 11:05
Seminarraum
Wednesday
29.04.
10:00 - 11:30
Seminarraum
Thursday
30.04.
10:20 - 11:05
Seminarraum
Wednesday
06.05.
10:00 - 11:30
Seminarraum
Thursday
07.05.
10:20 - 11:05
Seminarraum
Wednesday
13.05.
10:00 - 11:30
Seminarraum
Thursday
14.05.
10:20 - 11:05
Seminarraum
Wednesday
20.05.
10:00 - 11:30
Seminarraum
Wednesday
27.05.
10:00 - 11:30
Seminarraum
Thursday
28.05.
10:20 - 11:05
Seminarraum
Wednesday
03.06.
10:00 - 11:30
Seminarraum
Thursday
04.06.
10:20 - 11:05
Seminarraum
Wednesday
10.06.
10:00 - 11:30
Seminarraum
Wednesday
17.06.
10:00 - 11:30
Seminarraum
Thursday
18.06.
10:20 - 11:05
Seminarraum
Wednesday
24.06.
10:00 - 11:30
Seminarraum
Thursday
25.06.
10:20 - 11:05
Seminarraum
Information
Aims, contents and method of the course
Topological vector spaces; uniform spaces (a survey); locally convex vector spaces and vector spaces with systems of seminorms; projective and inductive locally convex topologies, inductive and projective limits, (LB)- and (LF)-spaces
Assessment and permitted materials
final oral exam after the course
Minimum requirements and assessment criteria
the obvious ones
Examination topics
as to content: all mathematical techniques;as to organizing the process of teaching and learning: see pages 3-4 of
http://studienservicecenter.univie.ac.at/fileadmin/user_upload/SSC/SSC_Mathematik/Diplomstudium/Studienplan/Studienplan_Mathematik.pdf
http://studienservicecenter.univie.ac.at/fileadmin/user_upload/SSC/SSC_Mathematik/Diplomstudium/Studienplan/Studienplan_Mathematik.pdf
Reading list
Schaefer, H. H., Topological Vector Spaces, third printing corrected, Springer, New York, 1971see also http://www.mat.univie.ac.at/~stein/lehre/WS0809/literature_lcvs.pdf (by permission of Roland Steinbauer)
Association in the course directory
MANF
Last modified: Mo 07.09.2020 15:40