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National Repository of Grey Literature

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	Systems of equations with anizotropic growth of dissipative potential Kalousek, Martin ; Kaplický, Petr (advisor) ; Pokorný, Milan (referee) In the present work we study the existence a properties of solution of the system of partial differential equations describing steady flow of Newtonian fluid. We consider that this system has anisotropic dissipative potential. We prove existence of weak solution to this system and its partial C1,α -regularity in 3D and full C1,α -regularity in 2D. 1 Detailed record
	Bogovskii lemma Kalousek, Martin ; Kaplický, Petr (advisor) ; Bulíček, Miroslav (referee) Detailed record
	Homogenization of flows of non-Newtonian fluids and strongly nonlinear elliptic systems Kalousek, Martin ; Kaplický, Petr (advisor) The theory of homogenization allows to find for a given system of partial differential equations governing a model with a very complicated internal struc- ture a system governing a model without this structure, whose solution is in a certain sense an approximation of the solution of the original problem. In this thesis, methods of the theory of homogenization are applied to three sys- tems of partial differential equations. The first one governs a flow of a class of non-Newtonian fluid through a porous medium. The second system is utilized for modeling of a flow of a fluid through an electric field wherein the viscosity depends significantly on the intensity of the electric field. For the third system is considered an elliptic operator having growth and coercivity indicated by a general anisotropic inhomogeneous N-function. 1 Detailed record
	Homogenization of flows of non-Newtonian fluids and strongly nonlinear elliptic systems Kalousek, Martin ; Kaplický, Petr (advisor) The theory of homogenization allows to find for a given system of partial differential equations governing a model with a very complicated internal struc- ture a system governing a model without this structure, whose solution is in a certain sense an approximation of the solution of the original problem. In this thesis, methods of the theory of homogenization are applied to three sys- tems of partial differential equations. The first one governs a flow of a class of non-Newtonian fluid through a porous medium. The second system is utilized for modeling of a flow of a fluid through an electric field wherein the viscosity depends significantly on the intensity of the electric field. For the third system is considered an elliptic operator having growth and coercivity indicated by a general anisotropic inhomogeneous N-function. 1 Detailed record
	Homogenization of flows of non-Newtonian fluids and strongly nonlinear elliptic systems Kalousek, Martin ; Kaplický, Petr (advisor) ; Diening, Lars (referee) ; Schwarzacher, Sebastian (referee) The theory of homogenization allows to find for a given system of partial differential equations governing a model with a very complicated internal struc- ture a system governing a model without this structure, whose solution is in a certain sense an approximation of the solution of the original problem. In this thesis, methods of the theory of homogenization are applied to three sys- tems of partial differential equations. The first one governs a flow of a class of non-Newtonian fluid through a porous medium. The second system is utilized for modeling of a flow of a fluid through an electric field wherein the viscosity depends significantly on the intensity of the electric field. For the third system is considered an elliptic operator having growth and coercivity indicated by a general anisotropic inhomogeneous N-function. 1 Detailed record
	Systems of equations with anizotropic growth of dissipative potential Kalousek, Martin ; Kaplický, Petr (advisor) ; Pokorný, Milan (referee) In the present work we study the existence a properties of solution of the system of partial differential equations describing steady flow of Newtonian fluid. We consider that this system has anisotropic dissipative potential. We prove existence of weak solution to this system and its partial C1,α -regularity in 3D and full C1,α -regularity in 2D. 1 Detailed record
	Bogovskii lemma Kalousek, Martin ; Bulíček, Miroslav (referee) ; Kaplický, Petr (advisor) Detailed record

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