241042 Differenzierbare Mannigfaltigkeiten (V) (WiSe 2014/2015)
Contents, comment
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Kurzbeschreibung: Mannigfaltigkeiten sind Räume, die lokal so ‘aussehen’ wie der R^n und oft entstehen als Lösungsmenge einer Gleichung, zum Beispiel x^2+y^2+z^2=1 (die Sphäre). Mannigfaltigkeiten sind in vielen verschiedenen Gebieten von Bedeutung: als Lie-Gruppen in der Algebra und Geometrie, als Raum-Zeit in der Relativitätstheorie, als Phasenräume und Energieflächen in der Mechanik etc.
In diesen Vorlesungen sollen die grundlegenden Begriffe und Verfahren der Geometrie und Topologie der Mannigfaltigkeiten behandelt werden. Einige typische Fragestellungen, die im Rahmen der Vorlesungen behandelt werden, beinhalten die Folgende:
- Wann ist die Lösungsmenge f(x)=0 eine Mannigfaltigkeit, wobei f: R^n->R^k eine stetig differenzierbare Abbildung ist?
- Wann sind zwei Mannigfaltigkeiten (z.B. wie oben) äquivalent?
- Wie kann man Abstände auf Mannigfaltigkeiten messen?
Requirements for participation, required level
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Analysis II, Lineare Algebra II
Teaching staff
Dates ( Calendar view )
| Frequency | Weekday | Time | Format / Place | Period | |
|---|---|---|---|---|---|
| weekly | Di | 14-16 | T2-214 | 13.10.2014-06.02.2015
not on: 12/23/14 / 12/30/14 |
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| weekly | Fr | 14-16 | V4-122 | 13.10.2014-06.02.2015 |
Subject assignments
| Module | Course | Requirements | |
|---|---|---|---|
| 24-M-P1 Profilierung 1 | Profilierungsvorlesung (mit Übung) - Typ 1 | Student information | |
| 24-M-P2 Profilierung 2 | Profilierungsvorlesung (mit Übungen) - Typ 1 | Student information | |
| 24-SE Strukturierte Ergänzung | Vorlesung 1 | Student information | |
| Vorlesung 2 | Student information |
The binding module descriptions contain further information, including specifications on the "types of assignments" students need to complete. In cases where a module description mentions more than one kind of assignment, the respective member of the teaching staff will decide which task(s) they assign the students.
| Degree programme/academic programme | Validity | Variant | Subdivision | Status | Semester | LP | |
|---|---|---|---|---|---|---|---|
| Mathematik / Diplom | (Enrollment until SoSe 2008) | Wahl | 5. 6. 7. 8. | scheinfähig |
- Registered number: 8
- This is the number of students having stored the course in their timetable. In brackets, you see the number of users registered via guest accounts.
- Address:
- WS2014_241042@ekvv.uni-bielefeld.de
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- Coverage:
- 3 Students to be reached directly via email
- Notes:
- Additional notes on the electronic mailing lists
- Last update basic details/teaching staff:
- Friday, December 11, 2015
- Last update times:
- Thursday, September 18, 2014
- Last update rooms:
- Thursday, September 18, 2014
- Type(s) / SWS (hours per week per semester)
- lecture (V) / 4
- Department
- Faculty of Mathematics
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- ID
- 49092374