AbstractIn this work a local projection stabilization method is proposed for solving a fictitious domain problem. The method adds a suitable fluctuation term to the formulation, thus yielding the natural space for the Lagrange multiplier stable. Stability and convergence are proved and these results are illustrated with a numerical experiment
In this paper we propose a class of jump-stabilized Lagrange multiplier methods for the finite-eleme...
3noA fictitious domain approach for the solution of second-order linear differential problems is pro...
We suggest a fictitious domain method, based on the Nitsche XFEM method of (Comput. Meth. Appl. Mech...
International audienceIn this work a local projection stabilization method is proposed to solve a fi...
AbstractIn this work a local projection stabilization method is proposed for solving a fictitious do...
We propose a fictitious domain method where the mesh is cut by the boundary. The primal solution is ...
In the Fictitious Domain Method with Lagrange multiplier (FDM) the physical domain is embedded into...
Projection stabilization applied to general Lagrange multiplier finite element methods is introduced...
In this paper, a new consistent method based on local projections for the stabilization of a Dirichl...
The purpose of this work is to approximate numerically an elliptic partial differential equation pos...
The purpose of this paper is to present a new fictitious domain approach inspired by the extended fi...
The main focus of this thesis is the smoothness of the solutions provided by fictitious domain metho...
local projection stabilization of fictitious domain method for elliptic boundary value problem
We extend the classical Nitsche type weak boundary conditions to a fictitious domain setting. An add...
AbstractIn this note, we propose an approximation of the solution of a Dirichlet problem by means of...
In this paper we propose a class of jump-stabilized Lagrange multiplier methods for the finite-eleme...
3noA fictitious domain approach for the solution of second-order linear differential problems is pro...
We suggest a fictitious domain method, based on the Nitsche XFEM method of (Comput. Meth. Appl. Mech...
International audienceIn this work a local projection stabilization method is proposed to solve a fi...
AbstractIn this work a local projection stabilization method is proposed for solving a fictitious do...
We propose a fictitious domain method where the mesh is cut by the boundary. The primal solution is ...
In the Fictitious Domain Method with Lagrange multiplier (FDM) the physical domain is embedded into...
Projection stabilization applied to general Lagrange multiplier finite element methods is introduced...
In this paper, a new consistent method based on local projections for the stabilization of a Dirichl...
The purpose of this work is to approximate numerically an elliptic partial differential equation pos...
The purpose of this paper is to present a new fictitious domain approach inspired by the extended fi...
The main focus of this thesis is the smoothness of the solutions provided by fictitious domain metho...
local projection stabilization of fictitious domain method for elliptic boundary value problem
We extend the classical Nitsche type weak boundary conditions to a fictitious domain setting. An add...
AbstractIn this note, we propose an approximation of the solution of a Dirichlet problem by means of...
In this paper we propose a class of jump-stabilized Lagrange multiplier methods for the finite-eleme...
3noA fictitious domain approach for the solution of second-order linear differential problems is pro...
We suggest a fictitious domain method, based on the Nitsche XFEM method of (Comput. Meth. Appl. Mech...