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Last update: G_M (07.05.2014)
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Last update: G_M (07.05.2014)
The course gives students a knowledge of various aspects of the finite volume method for the numerical solution of the Euler and Navier-Stokes equations. |
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Last update: doc. RNDr. Jiří Felcman, CSc. (07.06.2019)
Written and oral exam |
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Last update: G_M (07.05.2014)
Feistauer M.: Mathematical Methods in Fluid Dynamics, Longman Scientific-Technical, Harlow, l993. Feistauer M., Felcman J., Straskraba I.: Mathematical and Computational methods for Compressible Flow, Oxford University Press, 2003. |
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Last update: G_M (07.05.2014)
Lectures in a lecture hall. |
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Last update: G_M (07.05.2014)
Examination according to the syllabus. |
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Last update: G_M (07.05.2014)
Governing equations and relations of fluid dynamic: description of the flow, the transport theorem, the continuity equation, the equations of motion, the stress tensor, the Euler and Navier-Stokes equations, the energy equation, thermodynamical relations
Mathematical theory of compressible flow: the Euler equations, Properties of the Euler equations, Cauchy problem, boundary conditions, weak solution
Finite volume method for the Euler equations: finite volume mesh, derivation of a general finite volume scheme, properties of the numerical flux, construction of some numerical fluxes, the Godunov method, Riemann solver |
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Last update: G_M (07.05.2014)
There are no special entry requirements. |