Stabilisation methods are often used to circumvent the difficulties associated with the stability of mixed finite element methods. Stabilisation however also means an excessive amount of dissipation or the loss of nice conservation properties. It would thus be desirable to reduce these disadvantages to a minimum. We present a general framework, not restricted to mixed methods, that permits to introduce a minimal stabilising term and hence a minimal perturbation with respect to the original problem. To do so, we rely on the fact that some part of the problem is stable and should not be modified. Sections 2 and 3 present the method in an abstract framework. Section 4 and 5 present two classes of stabilisations for the inf-sup condition in ...
representation theorem, the Lax–Milgram theorem, Banach’s closed range theorem. Abstract mixed varia...
In this paper, we design two classes of stabilized mixed finite element methods for linear elasticit...
In this study, we consider some recent stabilization techniques for the Stokes' problem and show tha...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
This paper exploits the concept of stabilized finite element methods to formulate stable mixed stres...
This paper exploits the concept of stabilized finite element methods to formulate stable mixed stres...
Mixed finite element schemes for solving problems in continuum mechanics are often used to obtain hi...
summary:We outline a solution method for mixed finite element discretizations based on dissecting th...
In this paper, we design two classes of stabilized mixed finite element methods for linear elasticit...
Since the early 70's, mixed finite elements have been the object of a wide and deep study by the mat...
In this paper the recently introduced Variational Germano procedure is revisited. The procedure is e...
We study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed form...
This paper presents an extension to stabilized methods of the standard technique for the numerical a...
Abstract. We present a new family of stabilized methods for the Stokes problem. The focus of the pap...
In [1] a general framework for analyzing the convergence of multi-level methods for mixed finite ele...
representation theorem, the Lax–Milgram theorem, Banach’s closed range theorem. Abstract mixed varia...
In this paper, we design two classes of stabilized mixed finite element methods for linear elasticit...
In this study, we consider some recent stabilization techniques for the Stokes' problem and show tha...
Stabilized iterative schemes for mixed finite element methods are proposed and analyzed in two abstr...
This paper exploits the concept of stabilized finite element methods to formulate stable mixed stres...
This paper exploits the concept of stabilized finite element methods to formulate stable mixed stres...
Mixed finite element schemes for solving problems in continuum mechanics are often used to obtain hi...
summary:We outline a solution method for mixed finite element discretizations based on dissecting th...
In this paper, we design two classes of stabilized mixed finite element methods for linear elasticit...
Since the early 70's, mixed finite elements have been the object of a wide and deep study by the mat...
In this paper the recently introduced Variational Germano procedure is revisited. The procedure is e...
We study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed form...
This paper presents an extension to stabilized methods of the standard technique for the numerical a...
Abstract. We present a new family of stabilized methods for the Stokes problem. The focus of the pap...
In [1] a general framework for analyzing the convergence of multi-level methods for mixed finite ele...
representation theorem, the Lax–Milgram theorem, Banach’s closed range theorem. Abstract mixed varia...
In this paper, we design two classes of stabilized mixed finite element methods for linear elasticit...
In this study, we consider some recent stabilization techniques for the Stokes' problem and show tha...