Numerical Programming I - Winter 09: Difference between revisions
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| term = Winter 09 | | term = Winter 09 | ||
| lecturer = [[Univ.-Prof. Dr. Hans-Joachim Bungartz]] | | lecturer = [[Univ.-Prof. Dr. Hans-Joachim Bungartz]] | ||
| timeplace = Lecture: | | timeplace = Lecture: Tuesday 9:00 - 10:30, lecture room 02.07.023; Thursday 12:00 - 13:30, lecture room 02.07.023 | ||
: Tutorial: | : Tutorial: Monday, 14:15 - 15:45, lecture room 02.07.023 | ||
| credits = 6 SWS (4V + 2Ü) / 8 Credits | | credits = 6 SWS (4V + 2Ü) / 8 Credits | ||
| audience = Computational Science and Engineering, 1st semester ([https://www.in.tum.de/myintum/kurs_verwaltung/cm.html?cmid=228&lang=en module IN2156]) | | audience = Computational Science and Engineering, 1st semester ([https://www.in.tum.de/myintum/kurs_verwaltung/cm.html?cmid=228&lang=en module IN2156]) | ||
| Line 57: | Line 57: | ||
= Tutorial = | = Tutorial = | ||
Material will be updated throughout the semester) | (Material will be updated throughout the semester) | ||
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Here are the sheets for the tutorial: | Here are the sheets for the tutorial: | ||
Revision as of 12:46, 11 August 2009
- Term
- Winter 09
- Lecturer
- Univ.-Prof. Dr. Hans-Joachim Bungartz
- Time and Place
- Lecture: Tuesday 9:00 - 10:30, lecture room 02.07.023; Thursday 12:00 - 13:30, lecture room 02.07.023
- Tutorial: Monday, 14:15 - 15:45, lecture room 02.07.023
- Audience
- Computational Science and Engineering, 1st semester (module IN2156)
- Tutorials
- Stefanie Schraufstetter
- Exam
- t.b.a.
- Semesterwochenstunden / ECTS Credits
- 6 SWS (4V + 2Ü) / 8 Credits
- TUMonline
- {{{tumonline}}}
News
--
Contents
This course provides an overview of numerical algorithms. Topics are:
- Floating point arithmetics
- Solving Linear systems
- Interpolation
- Quadrature
- Eigenvalue problems
- Basics of iterative methods
- Basics of numerical methods for ordinary differential equations
The course will start with a short revision of mathematical foundations for numerical algorithms.
Lecture Notes
(Material will be updated throughout the semester)
Tutorial
(Material will be updated throughout the semester)
Exam
Details will follow.
Literature
- Stoer, Bulirsch: Numerische Mathematik, Springer-Verlag, part 1 (8. edition 1999) and part 2 (4. edition 2000)
- Stoer, Bulirsch: Introduction to Numerical Analysis, Springer, 3. edition 2002
- Dahlquist, Björck: Numerical Methods in Scientific Computing: Volume 1 & 2, SIAM 2008, http://www.mai.liu.se/~akbjo/NMbook.html
- Press, Flannery, Teukolsky, Vetterling: Numerical Recipes, Cambridge University Press
- Golub, Ortega: Scientific Computing: An Introduction with Parallel Computing, Academic Press, 1993