Please use this identifier to cite or link to this item: http://dspace.univ-guelma.dz/jspui/handle/123456789/11072
Title: Discretization of some parabolic problems
Authors: LABADLA, Amel
Keywords: Fractional integro-differential equations, Discrete problem, A priori estimate, Unknown Dirichlet condition
Issue Date: 25-Jul-2021
Abstract: In this thesis we present two fractional parabolic problems. In the first one, we treat the partial diffusion equation with an unknown boundary condition and a non-local coefficient. Using the Rothe method combined with the finite element method and an additional integral measure, we reconstruct the missing Dirichlet state. The presence of the non-local component leads to a large consuming of time when solving the equation numerically using the Newton method because the obtained Jacobian matrix is complete. In order to resolve these problems, we develop a method inspired from Gudi’s idea. The numerical experiment demonstrate the efficiency of the proposed approach. Secondly, the well-posedness( existence, uniqueness and some stability results) of the problem concerning the reconstruction of the unknown time-dependent boundary function for ractional integro- ifferential equation, for this purpose, we use an additional integral measurement with Rothe time discretization. Finally, we give some numerical examples to illustrate the results.
URI: http://dspace.univ-guelma.dz/jspui/handle/123456789/11072
Appears in Collections:Thèses de Doctorat

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