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101.245
AKNUM finite element methods
This course is in all assigned curricula part of the STEOP.
This course is in at least 1 assigned curriculum part of the STEOP.
2008W
2007W
2006W
2005W
2008W, VO, 3.0h, 4.5EC
Properties
Semester hours: 3.0
Credits: 4.5
Type: VO Lecture
Aim of course
The finite element method (FEM) is one of most important techniques for approximating solutions of elliptic partial differential equations. The lecture course covers the theoretical and algorithmic foundations of the FEM.
Subject of course
The outline of the lecture reads as follows: (1) Introduction: Examples of elliptic PDEs (2) Variational formulation of the elliptic boundary value problems (3) Function spaces and functional analytic framework of the FEM (4) Error analysis and convergence of the P1-FEM in 2D and 3D (5) Algorithmic realization and implementation of FEM (6) saddle point problems and mixed FEM One mayor topic of the course will be the derivation of a posteriori error estimators and the fundation of adaptive mesh-refining strategies.
Additional information
VORLESUNGSBEGINN: Di. 07.10.2008, 08:15 Uhr, Seminarraum 101 C (4. Stock, grün) HOMEPAGE:
http://www.asc.tuwien.ac.at/~dirk/?open=fem
Lecturers
Praetorius, Dirk
Institute
E101 Institute of Analysis and Scientific Computing
Course dates
Day
Time
Date
Location
Description
Fri
08:30 - 10:00
03.10.2008 - 31.01.2009
Sem.R. DA grün 04
PRAETORIUS
Tue
08:30 - 10:00
07.10.2008 - 31.01.2009
Sem.R. DA grün 04
PRAETORIUS
Show single appointments
AKNUM finite element methods - Single appointments
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P
1
2
N
E
Day
Date
Time
Location
Description
Fri
03.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
07.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
10.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
14.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
17.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
21.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
24.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
28.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
31.10.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
04.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
07.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
11.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
14.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
18.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
21.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
25.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
28.11.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
02.12.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Fri
05.12.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
Tue
09.12.2008
08:30 - 10:00
Sem.R. DA grün 04
PRAETORIUS
F
P
1
2
N
E
Course registration
Not necessary
Group Registration
Group
Registration From
To
VO Finite Elemente Methode (VO)
01.10.2008 00:00
31.01.2009 23:59
Register in a Group
Curricula
Study Code
Obligation
Semester
Precon.
Info
066 400 Mathematics
Not specified
066 401 Statistics
Not specified
066 402 Mathematics in Science and Technology
Mandatory elective
066 402 Mathematics in Science and Technology
Mandatory elective
066 403 Mathematics in Economics
Not specified
066 404 Mathematics in Computer Science
Not specified
066 405 Financial and Actuarial Mathematics
Not specified
066 453 Biomedical Engineering
Mandatory elective
860 Technical Mathematics
Not specified
864 Mathematics for Natural Sciences
Not specified
866 Economic Mathematics
Not specified
867 Statistics
Not specified
869 Mathematics in Computer Science
Not specified
873 Finance and Actuarial Mathematics
Not specified
Literature
Lecture notes for this course are available. Das Skript wird in der Vorlesung kostenlos ausgegeben.
Miscellaneous
Course homepage
Language
German