A reduced stabilized mixed finite-element (RSMFE) formulation based on proper orthogonal decomposition (POD) for the transient Navier-Stokes equations is presented. An ensemble of snapshots is compiled from the transient solutions derived from a stabilized mixed finite-element (SMFE) method based on two local Gauss integrations for the two-dimensional transient Navier-Stokes equations by using the lowest equal-order pair of finite elements. Then, the optimal orthogonal bases are reconstructed by implementing POD techniques for the ensemble snapshots. Combining POD with the SMFE formulation, a new low-dimensional and highly accurate SMFE method for the transient Navier-Stokes equations is obtained. The RSMFE formulation could not only greatl...
This article presents two new non-intrusive reduced order models based upon proper orthogonal decomp...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
We firstly employ a proper orthogonal decomposition (POD) method, Crank–Nicolson (CN) technique, and...
In this paper we present a stabilized finite element method to solve the transient Navier-Stokes equ...
The mixed finite element (MFE) method is one of the most valid numerical approaches to solve hydrody...
We investigate an Oseen two-level stabilized finite-element method based on the local pressure proje...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
Abstract. We present a new family of stabilized methods for the Stokes problem. The focus of the pap...
<p>A new method of stabilizing low-order, proper orthogonal decomposition based reduced-order models...
Abstract In this study, we devote ourselves to establishing a stabilized mixed finite element (MFE) ...
This dissertation focuses on the development, analysis, and implementation of numerical methods for ...
In light of the increasing demand for many-query and real-time PDE solutions, reduced basis methods ...
Tesis doctoral inédita leída en la Universidad Autónoma de Madrid, Facultad de Ciencias, Departament...
A method of reducing the number of degrees of freedom in FEM analysis has been devised. As in the ca...
This article presents two new non-intrusive reduced order models based upon proper orthogonal decomp...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
We firstly employ a proper orthogonal decomposition (POD) method, Crank–Nicolson (CN) technique, and...
In this paper we present a stabilized finite element method to solve the transient Navier-Stokes equ...
The mixed finite element (MFE) method is one of the most valid numerical approaches to solve hydrody...
We investigate an Oseen two-level stabilized finite-element method based on the local pressure proje...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
Abstract. We present a new family of stabilized methods for the Stokes problem. The focus of the pap...
<p>A new method of stabilizing low-order, proper orthogonal decomposition based reduced-order models...
Abstract In this study, we devote ourselves to establishing a stabilized mixed finite element (MFE) ...
This dissertation focuses on the development, analysis, and implementation of numerical methods for ...
In light of the increasing demand for many-query and real-time PDE solutions, reduced basis methods ...
Tesis doctoral inédita leída en la Universidad Autónoma de Madrid, Facultad de Ciencias, Departament...
A method of reducing the number of degrees of freedom in FEM analysis has been devised. As in the ca...
This article presents two new non-intrusive reduced order models based upon proper orthogonal decomp...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...