Add to ORKGWe study a non standard mixed formulation of the Poisson problem, sometimes known as dual mixed formulation. For reasons related to the equilibration of the flux, we use finite elements that are conforming in H(div) for the approximation of the gradients, even if the formulation would allow for discontinuous finite elements. The scheme is not uniformly inf-sup stable, but we can show existence and uniqueness of the solution, as well as optimal error estimates for the gradient variable when suitable regularity assumptions are made. Several additional remarks complete the paper, shedding some light on the sources of instability for mixed formulations
summary:Richards' equation is a widely used model of partially saturated flow in a porous medium. In...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
Since the early 70's, mixed finite elements have been the object of a wide and deep study by the mat...
This paper investigates the inf-sup stability of a dual mixed discretization of the Poisson problem ...
representation theorem, the Lax–Milgram theorem, Banach’s closed range theorem. Abstract mixed varia...
We indicate constraints on the space of finite elements providing the validity of discrete inf-sup c...
A new minimization principle for the Poisson equation using two variables – the solution and the g...
The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are...
ABSTRACT. The convergence and optimality of adaptive mixed finite element methods for the Poisson eq...
In this work we consider the dual-mixed variational formulation of the Poisson equation with a line ...
10.1142/S0218202501001161Mathematical Models and Methods in Applied Sciences115883-90
Stabilisation methods are often used to circumvent the difficulties associated with the stability of...
summary:We outline a solution method for mixed finite element discretizations based on dissecting th...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
Gradient elasticity formulations have the advantage of avoiding geometry‐induced singularities and c...
summary:Richards' equation is a widely used model of partially saturated flow in a porous medium. In...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
Since the early 70's, mixed finite elements have been the object of a wide and deep study by the mat...
This paper investigates the inf-sup stability of a dual mixed discretization of the Poisson problem ...
representation theorem, the Lax–Milgram theorem, Banach’s closed range theorem. Abstract mixed varia...
We indicate constraints on the space of finite elements providing the validity of discrete inf-sup c...
A new minimization principle for the Poisson equation using two variables – the solution and the g...
The convergence and optimality of adaptive mixed finite element methods for the Poisson equation are...
ABSTRACT. The convergence and optimality of adaptive mixed finite element methods for the Poisson eq...
In this work we consider the dual-mixed variational formulation of the Poisson equation with a line ...
10.1142/S0218202501001161Mathematical Models and Methods in Applied Sciences115883-90
Stabilisation methods are often used to circumvent the difficulties associated with the stability of...
summary:We outline a solution method for mixed finite element discretizations based on dissecting th...
Abstract. Least-squares finite element methods for first-order formulations of the Poisson equation ...
Gradient elasticity formulations have the advantage of avoiding geometry‐induced singularities and c...
summary:Richards' equation is a widely used model of partially saturated flow in a porous medium. In...
summary:An optimal part of the boundary of a plane domain for the Poisson equation with mixed bounda...
Since the early 70's, mixed finite elements have been the object of a wide and deep study by the mat...