Numerical Methods for Partial Differential Equations
Lecturer: | G. Kanschat |
Class data: |
KVV,
LSF,
LSF (Übung)
|
Tutorial: |
Monday, Tuesday, 4-6 pm, INF 368 (IWR), R. 248
|
Exams
Exams for this class will consist of a 20 minute long oral
interview. We have set aside Tuesday, March 18th, 2014 for
these interviews. Please schedule an appointment (referring to
these oral exams)
at sekretariat.kanschat@iwr.uni-heidelberg.de. If this
day is not convenient, please schedule an appointment for another day before Friday, April 25th, 2014.
Homework assignments
- Due 25.10.
- Due 8.11.
- Due 15.11.
- Due 22.11.
- Due 29.11.(Correction of Problem 5.1),
- Due 6.12.
- Due 13.12.
- Due 20.12.
- not graded
- Due 17.1.(Correction of Problem 10.1(c)
- Due 24.1. (bonus homework and exam preparation)
Notes
Literature
The main reference for this class is the book
- Ch. Grossmann, H.-G. Roos, M. Stynes:
Numerical Treatment of Partial Differential Equations,
Springer, 2007
or alternatively its German edition.
Additional recommended literature in the context of the class
is (from elementary to advanced)
- C. Johnson:
Numerical Solution of Partial Differential Equations by the
Finite Element Method, Dover, 2009
- R. H. W. Hoppe:
Finite
Element Methods, Vorlesung 2011
- A. Quarteroni, A. Valli:
Numerical Approximation of Partial Differential Equations,
Springer, 2008
- S. Brenner, R. Scott:
The Mathematical Theory of Finite Element Methods,
Springer, 2008
- Ph. Ciarlet:
The finite element method for elliptic problems,
North Holland, 1978 (online through "HEIDI")
- A. Ern, J.-L. Guermond:
Theory and Practice of Finite Elements,
Springer, 2010
In German/ auf deutsch: