Please use this identifier to cite or link to this item: https://hdl.handle.net/11147/2934
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dc.contributor.advisorTanoğlu, Gamzeen
dc.contributor.authorBaysal, Onur-
dc.date.accessioned2014-07-22T13:48:38Z-
dc.date.available2014-07-22T13:48:38Z-
dc.date.issued2012en
dc.identifier.urihttp://hdl.handle.net/11147/2934-
dc.descriptionThesis (Doctoral)--Izmir Institute of Technology, Mathematics, Izmir, 2012en
dc.descriptionIncludes bibliographical references (leaves: 92-96)en
dc.descriptionText in English; Abstract: Turkish and Englishen
dc.descriptionx, 96 leavesen
dc.description.abstractIn this thesis, enriched finite element methods are presented for both steady and unsteady convection diffusion equations. For the unsteady case, we follow the method of lines approach that consists of first discretizing in space and then use some time integrator to solve the resulting system of ordinary differential equation. Discretization in time is performed by the generalized Euler finite difference scheme, while for the space discretization the streamline upwind Petrov-Galerkin (SUPG), the Residual free bubble (RFB), the more recent multiscale (MS) and specific combination of RFB with MS (MIX) methods are considered. To apply the RFB and the MS methods, the steady local problem, which is as complicated as the original steady equation, should be solved in each element. That requirement makes these methods quite expensive especially for two dimensional problems. In order to overcome that drawback the pseudo approximation techniques, which employ only a few nodes in each element, are used. Next, for the unsteady problem a proper adaptation recipe, including these approximations combined with the generalized Euler time discretization, is described. For piecewise linear finite element discretization on triangular grid, the SUPG method is used. Then we derive an efficient stability parameter by examining the relation of the RFB and the SUPG methods. Stability and convergence analysis of the SUPG method applied to the unsteady problem is obtained by extending the Burman’s analysis techniques for the pure convection problem. We also suggest a novel operator splitting strategy for the transport equations with nonlinear reaction term. As a result two subproblems are obtained. One of which we may apply using the SUPG stabilization while the other equation can be solved analytically. Lastly, numerical experiments are presented to illustrate the good performance of the method.en
dc.language.isoenen_US
dc.publisherIzmir Institute of Technologyen
dc.rightsinfo:eu-repo/semantics/openAccessen_US
dc.subject.lcshHeat equationen
dc.subject.lcshFinite element methoden
dc.subject.lcshNumerical analysisen
dc.titleStabilized finite element methods for time dependent convection-diffusion equationsen_US
dc.typeDoctoral Thesisen_US
dc.institutionauthorBaysal, Onur-
dc.departmentThesis (Doctoral)--İzmir Institute of Technology, Mathematicsen_US
dc.relation.publicationcategoryTezen_US
item.fulltextWith Fulltext-
item.grantfulltextopen-
item.languageiso639-1en-
item.openairecristypehttp://purl.org/coar/resource_type/c_18cf-
item.cerifentitytypePublications-
item.openairetypeDoctoral Thesis-
Appears in Collections:Phd Degree / Doktora
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