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Mathematics of Multiscale Models
- Lecturer
- PD Dr. Iryna Rybak
- Details
- Vorlesung
2 cred.h, Sprache Englisch
Time and place: Mon 12:00 - 14:00, room tbd; comments on time and place: Die Vorlesung findet im Raum 04.387, Cauerstr. 11 statt.
- Fields of study
- WPF CAM-MA-MApA ab 1 (ECTS-Credits: 5)
WPF CAM-MA-NASi ab 1 (ECTS-Credits: 5)
WPF CAM-MA-Opti ab 1 (ECTS-Credits: 5)
WF M-MA ab 1 (ECTS-Credits: 5)
WF WM-MA ab 1 (ECTS-Credits: 5)
WF WM-BA 5 (ECTS-Credits: 5)
WF M-BA 5 (ECTS-Credits: 5)
WF TM-BA 5 (ECTS-Credits: 5)
- Prerequisites / Organisational information
- Basic knowledge in numerical methods and partial differential equations
- Contents
- Multiscale problems (fluid flows in porous media, heat transfer in composite materials).
Development of macroscale models using averaging techniques (homogenization, volume averaging, numerical upscaling).
Numerical methods for multiscale problems in space and time (multiscale finite elements, multiscale finite volumes, multipoint flux approximation, two-grid methods, time-splitting schemes).
- Recommended literature
- J.-L. Auriault, C. Boutin, C. Geindreau, Homogenization of Coupled Phenomena in Heterogenous Media, 2009
U. Hornung, Homogenization and Porous Media, 1996.
W. E, Principles of Multiscale Modeling, 2011.
Y. Efendiev, T. Hou, Multiscale Finite Element Methods: Theory and Applications, 2009.
B. Smith, P. Bjorstad, W. Gropp, Domain Decomposition: Parallel Multilevel Methods for Elliptic Partial Differential Equations, 2004.
S. Whitaker, The Method of Volume Averaging, 1999.
- Additional information
- Verwendung in folgenden UnivIS-Modulen
- Startsemester WS 2017/2018:
- Mathematics of Multiscale Models (MaMM)
- Department: Department of Mathematics
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