312.184 (24S) Nonlinear Analysis, exercises
Überblick
- Lehrende/r
- LV-Titel englisch Nonlinear Analysis, exercises
- LV-Art Übung (prüfungsimmanente LV )
- LV-Modell Präsenzlehrveranstaltung
- Semesterstunde/n 1.0
- ECTS-Anrechnungspunkte 2.0
- Anmeldungen 6
- Organisationseinheit
- Unterrichtssprache Englisch
- LV-Beginn 05.03.2024
- eLearning zum Moodle-Kurs
Zeit und Ort
LV-Beschreibung
Intendierte Lernergebnisse
After successful completion of this course, students will be able to:
- Understand fundamental concepts and results of Nonlinear Analysis;
- Apply the results to solve various problems and thoroughly explain the theorems.
Lehrmethodik
Students have to solve weekly problem sets. In the exercise class, students are expected to present their solutions on the board.
Inhalt/e
See the lecture.
Curriculare Anmeldevoraussetzungen
See the lecture.
Literatur
Gerald Teschl, University of Vienna, Topics in Real and Functional Analysis, Graduate Studies in Mathematics, Volume XXX, Amer. Math. Soc., Providence, (to appear).
Prüfungsinformationen
Prüfungsmethode/n
The exercise sheet is uploaded to Moodle a week before the class. All students are encouraged to do the assignments weekly. Presence is required when crossing the assignments on ZEUS.
The final grade relies on regularly doing the exercises and good presentation. During the semester, one student is supposed to present the solutions on the board at least two times.
In total, there are 100 points. The number of exercises solved counts 70 points, the presentation in total counts 30 points.
Students gain some bonus points by actively participating in the activities of the class.
The point scheme is as follows:
| 100-86 points: | 1 |
| 85-75 points: | 2 |
| 74-62 points: | 3 |
| 61-50 points: | 4 |
| 49-0 points: | 5 |
Prüfungsinhalt/e
contents of exercises and corresponding background from lecture
Beurteilungskriterien/-maßstäbe
The mark depends on the number of points the student achieves (by solving exercises, presenting solutions and taking part in activities of the class).
Beurteilungsschema
Note BenotungsschemaPosition im Curriculum
- Masterstudium Mathematics
(SKZ: 401, Version: 18W.1)
-
Fach: Applied Analysis
(Wahlfach)
-
4.5 Nonlinear Analysis (
1.0h UE / 2.0 ECTS)
- 312.184 Nonlinear Analysis, exercises (1.0h UE / 2.0 ECTS)
-
4.5 Nonlinear Analysis (
1.0h UE / 2.0 ECTS)
-
Fach: Applied Analysis
(Wahlfach)
- Masterstudium Mathematics
(SKZ: 401, Version: 18W.1)
-
Fach: Applied Mathematics
(Wahlfach)
-
Lehrveranstaltungen aus den Vertiefungsfächern (
0.0h XX / 12.0 ECTS)
- 312.184 Nonlinear Analysis, exercises (1.0h UE / 2.0 ECTS)
-
Lehrveranstaltungen aus den Vertiefungsfächern (
0.0h XX / 12.0 ECTS)
-
Fach: Applied Mathematics
(Wahlfach)
- Masterstudium Mathematics
(SKZ: 401, Version: 22W.1)
-
Fach: Applied Analysis
(Wahlfach)
-
4.4 Nonlinear Analysis (
1.0h UE / 2.0 ECTS)
- 312.184 Nonlinear Analysis, exercises (1.0h UE / 2.0 ECTS) Absolvierung im 1., 2., 3. Semester empfohlen
-
4.4 Nonlinear Analysis (
1.0h UE / 2.0 ECTS)
-
Fach: Applied Analysis
(Wahlfach)
- Masterstudium Mathematics
(SKZ: 401, Version: 22W.1)
-
Fach: Applied Mathematics
(Wahlfach)
-
7.1 Wahl von weiteren Lehrveranstaltungen aus den Vertiefungsfächern (
0.0h XX / 12.0 ECTS)
- 312.184 Nonlinear Analysis, exercises (1.0h UE / 2.0 ECTS) Absolvierung im 2., 3. Semester empfohlen
-
7.1 Wahl von weiteren Lehrveranstaltungen aus den Vertiefungsfächern (
0.0h XX / 12.0 ECTS)
-
Fach: Applied Mathematics
(Wahlfach)