Titre :	Stabilized numerical schemes for iterative solution of the generalized Stokes problem.
Type de document :	texte imprimé
Auteurs :	Alima Chibani, Auteur ; Nasserdine Kechkar, Directeur de thèse
Mention d'édition :	30/11/2020
Editeur :	جامعة الإخوة منتوري قسنطينة
Année de publication :	2020
Importance :	85 f.
Format :	30 cm.
Note générale :	1 copies imprimées disponibles
Langues :	Français (fre)
Catégories :	Français - Anglais Mathématiques
Tags :	Mathematiques: Analyse numérique  Stokes problem  Finite elements  Stabilization  Iterative methods  Problème de Stokes  Eléments finis  Stabilisation  Méthodes itératives  مشكل ستوكس  العناصر المنتهية  الاستقرار  الطرق التكرارية
Index. décimale :	510 Mathématiques
Résumé :	In this thesis, some novel discrete formulations for stabilizing the mixed nite element method Q1-Q0 (bilinear velocity and constant pressure approximations) are introduced and discussed for the generalized Stokes problem. These are based on stabilizing discontinuous pressure approximations via local jump operators. The developing idea consists in a reduction of terms in the local jump formulation, introduced earlier, in such a way that stability and convergence properties are preserved. Moreover, some iterative methods of conjugate gradient type are discussed and their algorithms are presented. These are used for the iterative solution of the algebraic systems of linear equations which arise from the spatial discretization of the continuous problem. The computer implementation aspects and numerical evaluation of the stabilized discrete formulations are also considered. For illustrating the numerical performance of the proposed approaches and comparing the three versions of the local jump methods against the global jump setting, some obtained results for two test generalized Stokes problems are presented. Numerical tests con rm the stability and accuracy characteristics of the resulting approximations. Likewise, the numerical reliability of the discussed iterative solvers is assessed.
Diplôme :	Doctorat en sciences
En ligne :	../theses/math/CHI7709.pdf
Format de la ressource électronique :	pdf
Permalink :	index.php?lvl=notice_display&id=11543

Stabilized numerical schemes for iterative solution of the generalized Stokes problem. [texte imprimé] / Alima Chibani, Auteur ; Nasserdine Kechkar, Directeur de thèse  . -  30/11/2020 . - جامعة الإخوة منتوري قسنطينة, 2020 . - 85 f. ; 30 cm.
1 copies imprimées disponibles

Langues : Français (fre)

Catégories :	Français - Anglais Mathématiques
Tags :	Mathematiques: Analyse numérique  Stokes problem  Finite elements  Stabilization  Iterative methods  Problème de Stokes  Eléments finis  Stabilisation  Méthodes itératives  مشكل ستوكس  العناصر المنتهية  الاستقرار  الطرق التكرارية
Index. décimale :	510 Mathématiques
Résumé :	In this thesis, some novel discrete formulations for stabilizing the mixed nite element method Q1-Q0 (bilinear velocity and constant pressure approximations) are introduced and discussed for the generalized Stokes problem. These are based on stabilizing discontinuous pressure approximations via local jump operators. The developing idea consists in a reduction of terms in the local jump formulation, introduced earlier, in such a way that stability and convergence properties are preserved. Moreover, some iterative methods of conjugate gradient type are discussed and their algorithms are presented. These are used for the iterative solution of the algebraic systems of linear equations which arise from the spatial discretization of the continuous problem. The computer implementation aspects and numerical evaluation of the stabilized discrete formulations are also considered. For illustrating the numerical performance of the proposed approaches and comparing the three versions of the local jump methods against the global jump setting, some obtained results for two test generalized Stokes problems are presented. Numerical tests con rm the stability and accuracy characteristics of the resulting approximations. Likewise, the numerical reliability of the discussed iterative solvers is assessed.
Diplôme :	Doctorat en sciences
En ligne :	../theses/math/CHI7709.pdf
Format de la ressource électronique :	pdf
Permalink :	index.php?lvl=notice_display&id=11543