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Numerical solution of the shallow water equations
Šerý, David ; Dolejší, Vít (advisor) ; Felcman, Jiří (referee)
The thesis deals with the numerical solution of partial differential equati- ons describing the flow of the so-called shallow water neglecting the flow in the vertical direction. These equations are of hyperbolical type of the first or- der with a reactive term representing the bottom topology. We discretize the resulting system of equations by the implicit space-time discontinuous Ga- lerkin method (STDGM). In the literature, the explicit techniques are used most of the time. The implicit approach is suitable especially for adaptive methods, because it allows the usage of different meshes for different time niveaus. In the thesis we derive the corresponding method and an adaptive algorithm. Finally, we present usage of the method in several examples. 1
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Použití metody konečných objemů pro proudění s volnou hladinou
Hoření, Bohumír ; Chára, Zdeněk
The contribution deals with an application of discontinuous Galerkin method to free surface flow calculation. Both the super- and sub-critical flows are studied for steady and unsteady flow conditions. The numerical method is tested experimentally on flow over a broad crest weir of height to length ratio 1/8. Also VOF (volume of fluid) method is tested for the same geometrical configuration.
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