Multigrid - finite element method for partial differential equations and their optimal control /
Ayate Mohammad Abuelkhair Behairy
Multigrid - finite element method for partial differential equations and their optimal control / طريقة الخطوط المتعددة والعناصر المحدودة لحل المعادلات التفاضلية الجزئية والتحكم الأمثل فيها Ayate Mohammad Abuelkhair Behairy ; Supervised L. F. Abdelal , N. H. Sweilam - Cairo : Ayate Mohammad Abuelkhair Behairy , 2010 - 102P. : charts ; 25cm
Thesis (M.Sc.) - Cairo University - Faculty of Science - Department of Mathematics
The first aim of this thesis is to study the multigrid method for solving a system of linear equations resulting from a discretization of a partial differential equation (PDE ) using the finite difference and finite element discretizations . Another aim is to study the multigrid t - extrapolation method for solving couled systems of PDEs and obtaining an improved convergence order and a high accuracy in compared with a direct solver such as the Gauss - elimination method
Coupled System in Thermoelasticity Multi - grid t - extrapolation method
Multigrid - finite element method for partial differential equations and their optimal control / طريقة الخطوط المتعددة والعناصر المحدودة لحل المعادلات التفاضلية الجزئية والتحكم الأمثل فيها Ayate Mohammad Abuelkhair Behairy ; Supervised L. F. Abdelal , N. H. Sweilam - Cairo : Ayate Mohammad Abuelkhair Behairy , 2010 - 102P. : charts ; 25cm
Thesis (M.Sc.) - Cairo University - Faculty of Science - Department of Mathematics
The first aim of this thesis is to study the multigrid method for solving a system of linear equations resulting from a discretization of a partial differential equation (PDE ) using the finite difference and finite element discretizations . Another aim is to study the multigrid t - extrapolation method for solving couled systems of PDEs and obtaining an improved convergence order and a high accuracy in compared with a direct solver such as the Gauss - elimination method
Coupled System in Thermoelasticity Multi - grid t - extrapolation method