Inhalt
[ 403COEXNMEU22 ] UE Numerical Methods for Elliptic Equations
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| Workload |
Education level |
Study areas |
Responsible person |
Hours per week |
Coordinating university |
| 1,5 ECTS |
M1 - Master's programme 1. year |
Mathematics |
Herbert Egger |
1 hpw |
Johannes Kepler University Linz |
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| Detailed information |
| Original study plan |
Master's programme Industrial Mathematics 2022W |
| Objectives |
Support the understanding of the course material.
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| Subject |
Examples of linear elliptic boundary value problems, properties of Sobolev spaces, weak formulation, existence of weak solutions, elliptic variational problems, Galerkin approximation, finite element method, a-priori error estimates, duality arguments, implementational aspects, linear solvers, a-posteriori error estimation, adaptive mesh refinement, non-conforming Galerkin approximation, finite volume methods, discontinuous Galerkin methods, nonlinear elliptic problems.
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| Criteria for evaluation |
Presentation of exercises at blackboard and presentation of projects.
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| Language |
English |
| Study material |
Lecture notes and programming tutorials
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| Changing subject? |
No |
| Corresponding lecture |
TM1WBUENELL UE Numerik elliptischer Probleme (3 ECTS)
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| On-site course |
| Maximum number of participants |
20 |
| Assignment procedure |
Direct assignment |
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