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| Semester | fall semester 2024 |
| Course frequency | Every fall sem. |
| Lecturers | Helmut Harbrecht (helmut.harbrecht@unibas.ch, Assessor) |
| Content | Numerical methods for the solution of elliptic and parabolic partial differential equations. The focus of the course lies on finite element methods, implementation, and convergence theory. |
| Learning objectives | Theoretical and practical aspects of finite element methods for the solution of elliptic and parabolic problems. |
| Bibliography | D. Braess: Finite Elemente, Springer C. Johnson: Numerical Solutions of Partial Differential Equations by FEM |
| Comments | Both, the course and the exercise sessions, will be taught in presence at the blackboard. |
| Weblink | Info Webseite |
| Admission requirements | Analysis und Lineare Algebra oder Mathematische Methoden I-IV, Einführung in die Numerik, Numerik der Differentialgleichungen. Knowledge of a programming language, e.g. Matlab. |
| Language of instruction | German |
| Use of digital media | |
| Course auditors welcome |
| Interval | Weekday | Time | Room |
|---|---|---|---|
| wöchentlich | Tuesday | 10.15-12.00 | Spiegelgasse 5, Seminarraum 05.001 |
| wöchentlich | Thursday | 10.15-12.00 | Spiegelgasse 5, Seminarraum 05.001 |
| Modules |
Module Specialisation: Numerics (Master's Studies: Mathematics) Module: Electives in Data Science (Master's Studies: Data Science) Module: Mathematical Foundations (Master's Studies: Data Science) |
| Assessment format | continuous assessment |
| Assessment details | Weekly homework. Four programming sheets. |
| Assessment registration/deregistration | Reg.: course registration, dereg: cancel course registration |
| Repeat examination | no repeat examination |
| Scale | Pass / Fail |
| Repeated registration | as often as necessary |
| Responsible faculty | Faculty of Science, studiendekanat-philnat@unibas.ch |
| Offered by | Fachbereich Mathematik |