240073 Partielle Differentialgleichungen (V) (SoSe 2020)
Contents, comment
-
Es werden grundlegende Beispiele linearer partieller Differentialgleichungen
studiert wie die Poissongleichung, die Wärmeleitungsgleichung oder die
Wellengleichung. Weiter werden Sobolevräume und Grundlagen zur schwachen
Lösungstheorie behandelt.Die Veranstaltung findet bis auf Weiteres nicht als Präsenzveranstaltung statt. Die Vorlesung wird durch einen Readingcourse ersetzt. Sie erhalten das notwendige Material über den Lernraum. Ergänzt wird das Material zum Selbststudium durch Videoaufzeichnungen, in denen der Lehrende Inhalte ergänzend erklärt, sowie eine wöchentliche Videokonferenz, in der Fragen diskutiert werden können. Organisatorische Hinweise (z.B. auch zum Übungsbetrieb) finden Sie im
Lernraum zur Veranstaltung.
Requirements for participation, required level
-
Analysis I, II, lineare Algebra I, II, Maß- und
Integrationstheorie
Bibliography
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L.C. Evans: Partial Differential Equations. Graduate Studies in Mathematics
(Band 19), American Mathematical Society.J. Jost, Partielle Differentialgleichungen, Springer
B. Schweizer: Partielle Differentialgleichungen. Eine anwendungsorientierte
Einführung. Springer Spektrum.
Teaching staff
Dates ( Calendar view )
| Frequency | Weekday | Time | Format / Place | Period | |
|---|---|---|---|---|---|
| weekly | Mo | 14-16 | T2-227 | 06.04.-17.07.2020 | |
| weekly | Mi | 12-14 | U2-233 | 06.04.-17.07.2020 |
Subject assignments
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 | |
|---|---|---|---|---|---|---|---|
| Bielefeld Graduate School in Theoretical Sciences / Promotion | |||||||
| Mathematik / Promotion | Subject-specific qualification | 4 | aktive Teilnahme oder unbenotete Einzelleistung |
- E-Learning Space
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- Registered number: 30
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- 19 Students to be reached directly via email
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- Additional notes on the electronic mailing lists
- Last update basic details/teaching staff:
- Monday, March 30, 2020
- Last update times:
- Wednesday, February 12, 2020
- Last update rooms:
- Wednesday, February 12, 2020
- Type(s) / SWS (hours per week per semester)
- lecture (V) / 4
- Language
- This lecture is taught in english
- Department
- Faculty of Mathematics
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