250022 UE Tutorial: Real analysis into several and complex analysis into variable for SSTAP (2008W)
Continuous assessment of course work
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Summary
Registration/Deregistration
Groups
Group 1
Language: German
Lecturers
Classes (iCal) - next class is marked with N
Wednesday
08.10.
13:00 - 15:00
Seminarraum
Wednesday
15.10.
13:00 - 15:00
Seminarraum
Wednesday
22.10.
13:00 - 15:00
Seminarraum
Wednesday
29.10.
13:00 - 15:00
Seminarraum
Wednesday
05.11.
13:00 - 15:00
Seminarraum
Wednesday
12.11.
13:00 - 15:00
Seminarraum
Wednesday
19.11.
13:00 - 15:00
Seminarraum
Wednesday
26.11.
13:00 - 15:00
Seminarraum
Wednesday
03.12.
13:00 - 15:00
Seminarraum
Wednesday
10.12.
13:00 - 15:00
Seminarraum
Wednesday
17.12.
13:00 - 15:00
Seminarraum
Wednesday
07.01.
13:00 - 15:00
Seminarraum
Wednesday
14.01.
13:00 - 15:00
Seminarraum
Wednesday
21.01.
13:00 - 15:00
Seminarraum
Wednesday
28.01.
13:00 - 15:00
Seminarraum
Aims, contents and method of the course
Metric spaces, differentiability in higher dimensions, integral in higher dimensions, integrals on curves and superficies, complex analysis, complex differentiability, power series, Laurent series, isolated singularities.
Assessment and permitted materials
It is successfully passed in case of continuous activities and presentations, and positive marks on the tests.
Minimum requirements and assessment criteria
Ability to solve mathematical problems, ability to solve problems in analysis, knowledge in analysis.
Examination topics
Interactive.
Group 2
Language: German
Lecturers
Classes (iCal) - next class is marked with N
Thursday
09.10.
13:00 - 15:00
Seminarraum
Thursday
16.10.
13:00 - 15:00
Seminarraum
Thursday
23.10.
13:00 - 15:00
Seminarraum
Thursday
30.10.
13:00 - 15:00
Seminarraum
Thursday
06.11.
13:00 - 15:00
Seminarraum
Thursday
13.11.
13:00 - 15:00
Seminarraum
Thursday
20.11.
13:00 - 15:00
Seminarraum
Thursday
27.11.
13:00 - 15:00
Seminarraum
Thursday
04.12.
13:00 - 15:00
Seminarraum
Thursday
11.12.
13:00 - 15:00
Seminarraum
Thursday
18.12.
13:00 - 15:00
Seminarraum
Thursday
08.01.
13:00 - 15:00
Seminarraum
Thursday
15.01.
13:00 - 15:00
Seminarraum
Thursday
22.01.
13:00 - 15:00
Seminarraum
Thursday
29.01.
13:00 - 15:00
Seminarraum
Aims, contents and method of the course
Metrische Räume, mehrdimensionale Differenzierbarkeit, mehrdimensionale Integrale, Kurven- und Oberflächenintegrale, komplexe Analysis, komplexe Differenzierbarkeit, Potenzreihen, Laurentreihen, isolierte Singularitäten.
Assessment and permitted materials
Erfolgreicher Abschluss durch regelmäßige Mitarbeit und Präsentationen, sowie positive Leistungen bei Zwischenprüfungen.
Minimum requirements and assessment criteria
Fähigkeit zum Lösen mathematischer Probleme, Fähigkeiten zum Lösen von Problemen der Analysis, Kenntnisse in Analysis.
Examination topics
interaktiv
Information
Reading list
siehe Vorlesung
Association in the course directory
LA
Last modified: Mo 07.09.2020 15:40