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Last update: T_KNM (18.05.2008)
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Last update: T_KNM (18.05.2008)
The course gives students a knowledge of advanced techniques of the finite element method which are not treated in the basic course of the finite element method. |
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Last update: T_KNM (18.05.2008)
Brenner, S., Scott, R.: The mathematical theory of finite element methods, 1994
Ciarlet, P.G.: The finite element method for elliptic problems, l978
Thomée, V.: Galerkin finite element methods for parabolic problems, 1997
Verfürth, R.: A review of a posteriori error estimation and adaptive mesh-refinement techniques, 1996 |
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Last update: T_KNM (18.05.2008)
Lectures in a lecture hall. |
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Last update: T_KNM (18.05.2008)
Examination according to the syllabus. |
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Last update: PhDr. František Knobloch, CSc. (10.02.2007)
The lectures will be devoted to topics for which no time remains in the basic course on the finite element method and whose selection can be adopted to interests of the students. Possible topics include approximation of the boundary, isoparametric finite elements, adaptive methods, solution of incompressible problems, multigrid method, implementation of discrete problems. |
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Last update: T_KNM (18.05.2008)
Students are expected to have attended a basic course of the finite element method. |