Add to ORKGIn this paper we analyze time marching schemes for the wave equation in mixed form. The problem is discretized in space using stabilized finite elements. On the one hand, stability and convergence analyses of the fully discrete numerical schemes are presented using different time integration schemes and appropriate functional settings. On the other hand, we use Fourier techniques (also known as von Neumann analysis) in order to analyze stability, dispersion and dissipation. Numerical convergence tests are presented for various time integration schemes, polynomial interpolations (for the spatial discretization), stabilization methods, and variational forms. To analyze the behavior of the different schemes considered, a 1D wave propagation pr...
We consider a stabilized finite element method based on a spacetime formulation, where the equations...
This article presents an introduction to multiscale and stabilized methods, which represent unied ap...
The time-dependent Stokes problem is solved using continuous, piecewise linear finite elements and a...
In this paper we analyze time marching schemes for the wave equation in mixed form. The problem is d...
In this paper we analyze time marching schemes for the wave equation in mixed form. The problem is ...
The present work is a compilation of the research produced in the field of wave propagation modeling...
The present work is a compilation of the research produced in the field of wave propagation modeling...
A family of implicit-in-time mixed finite element schemes is presented for the numerical approximati...
A family of implicit-in-time mixed finite element schemes is presented for the numerical approximati...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
In this work we present stabilized finite element methods for the mixed velocity–stress elasticity e...
In this work we present stabilized finite element methods for the mixed velocity–stress elasticity e...
This report presents the space-time convergence analysis of two implicit discretization strategies f...
In this paper, Fourier analysis is used to investigate various approximation methods for the one- an...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
We consider a stabilized finite element method based on a spacetime formulation, where the equations...
This article presents an introduction to multiscale and stabilized methods, which represent unied ap...
The time-dependent Stokes problem is solved using continuous, piecewise linear finite elements and a...
In this paper we analyze time marching schemes for the wave equation in mixed form. The problem is d...
In this paper we analyze time marching schemes for the wave equation in mixed form. The problem is ...
The present work is a compilation of the research produced in the field of wave propagation modeling...
The present work is a compilation of the research produced in the field of wave propagation modeling...
A family of implicit-in-time mixed finite element schemes is presented for the numerical approximati...
A family of implicit-in-time mixed finite element schemes is presented for the numerical approximati...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
In this work we present stabilized finite element methods for the mixed velocity–stress elasticity e...
In this work we present stabilized finite element methods for the mixed velocity–stress elasticity e...
This report presents the space-time convergence analysis of two implicit discretization strategies f...
In this paper, Fourier analysis is used to investigate various approximation methods for the one- an...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
We consider a stabilized finite element method based on a spacetime formulation, where the equations...
This article presents an introduction to multiscale and stabilized methods, which represent unied ap...
The time-dependent Stokes problem is solved using continuous, piecewise linear finite elements and a...