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National Repository of Grey Literature

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	Modelling of the heat transfer by differential equations Sklenářová, Lenka ; Tomášek, Petr (referee) ; Nechvátal, Luděk (advisor) The thesis focuses on basic principals of heat transfer, on deduction of parabolic equation, on heat conduction in a rod, as well as in higher dimension, including discussion on boundary and initial conditions. The thesis deals with solving steady states in given environment where only one direction is significant. Detailed record
	Superconvergence for discontinuous Galerkin time discretizations Roskovec, Filip ; Vlasák, Miloslav (advisor) ; Knobloch, Petr (referee) The topic of this thesis is the application of the discontinuous Galerkin finite element method (DGFEM) on space-time discretizations of simple nonstationary problems. Unlike the standard finite element method, discontinuous Galerkin method does not require any continuity between neighbouring elements. We apply the DGFEM separately in space and in time. At first, we implement discretization with respect to space variables, whereby we acquire the space semidiscretization. Subsequently we apply Time discontinuous Galerkin method to the problem. We seek the aproximate solution in the space of discontinuous piecewise polynomial functions of degree p in space and degree q in time. This is followed by the error estimates of this scheme. In the end we examine the supercovergence behaviour of the scheme in nodes of the time discretization. The theoretical results are verified by numerical experiments. Detailed record
	Superconvergence for discontinuous Galerkin time discretizations Roskovec, Filip ; Vlasák, Miloslav (advisor) ; Knobloch, Petr (referee) The topic of this thesis is the application of the discontinuous Galerkin finite element method (DGFEM) on space-time discretizations of simple nonstationary problems. Unlike the standard finite element method, discontinuous Galerkin method does not require any continuity between neighbouring elements. We apply the DGFEM separately in space and in time. At first, we implement discretization with respect to space variables, whereby we acquire the space semidiscretization. Subsequently we apply Time discontinuous Galerkin method to the problem. We seek the aproximate solution in the space of discontinuous piecewise polynomial functions of degree p in space and degree q in time. This is followed by the error estimates of this scheme. In the end we examine the supercovergence behaviour of the scheme in nodes of the time discretization. The theoretical results are verified by numerical experiments. Detailed record
	Modelling of the heat transfer by differential equations Sklenářová, Lenka ; Tomášek, Petr (referee) ; Nechvátal, Luděk (advisor) The thesis focuses on basic principals of heat transfer, on deduction of parabolic equation, on heat conduction in a rod, as well as in higher dimension, including discussion on boundary and initial conditions. The thesis deals with solving steady states in given environment where only one direction is significant. Detailed record

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