Partial Differential Equations I Semester SoSe 2022
Lecturer Helmut Abels
Type of course (Veranstaltungsart) Vorlesung
German title Partielle Differentialgleichungen I
Contents The lecture series gives an introduction to the theory of partial differential equations (PDEs). In the first part we will study classical solution theories for PDEs. In particular we will discuss some fundamental equations and examples and show limitations of classical solution concepts. In the second part of the lecture series an introduction to the modern theory of PDEs is given, which is based on a weaker notion of solutions and functional analytic concepts. In particular we will study elliptic PDEs.
The content of the lecture consists of the following parts:
- nonlinear PDEs of first order, method of characteristics
- fundamental examples for PDEs of second order
- maximum principles for elliptic and parabolic PDEs
- distributions and Sobolev spaces
- linear elliptic PDEs
Literature
- M. Renardy und R. C. Rogers, An Introduction to Partial Differential Equations, Springer, 1993
- L.C. Evans, Partial Differential Equations, American Mathematical Society, 1998
Recommended previous knowledge Analysis I-III, Linear Algebra I: useful, but not necessary: Functional Analysis
Time/Date Mo. 12-14 and Thu. 8-10
Location Mo. 12-14 in M104, Thu. 8-10 in M103
Course homepage https://elearning.uni-regensburg.de/course/view.php?id=54444 (Disclaimer: Dieser Link wurde automatisch erzeugt und ist evtl. extern)
Registration- Preliminary registration for the organisation of exercise classes: at the end of the previous
semester via EXA or LSF (see announcement by the department) - Registration for the exercise classes: During the first week of the lecture time in the summer
term 2022 via the course homepage (GRIPS). - Registration for course work/examination/ECTS: FlexNow
Course work (Studienleistungen)- Successful participation in the exercise classes: 50% of the maximal points in the
exercise
sheets, satisfactory presentation of one solution - For module MV (without mark, "unbenotet"): passing a short oral examination
("Fachgespräch", 15 min.) on the content of the lecture series Examination (Prüfungsleistungen)- Oral exam: Duration: 30 minutes, Date: individual, by appointment, re-exam: Date: individual,
by appointment - Combined exam in agreement with the lecturer in combination with, e.g.: Functional Analysis or
Partial Differential Equation II, oral exam: Duration: 45 minutes, Date: individual, by appointment Additional comments The combined exam is an alternative to the oral examination of 30 minutes.
Modules BV, MV, MAngAn, PHY-B-WE3, PHY-M-VE3, CS-B-Math4, CS-M-P1, CS-M-P2, CS-M-P3
ECTS 9
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