Add to ORKGProjection stabilization applied to general Lagrange multiplier finite element methods is introduced and analyzed in an abstract framework. We then consider some applications of the stabilized methods: (i) the weak imposition of boundary conditions, (ii) multiphysics coupling on unfitted meshes, (iii) a new interpretation of the classical residual stabilized Lagrange multiplier method introduced in Barbosa and Hughes, Comput Methods Appl Mech Eng 85 (1991), 109–128. © 2013 The Authors. Numerical Methods for Partial Differential Equations Published by Wiley Periodicals, Inc. 30: 567–592, 201
In the unfitted finite element methods, traditionally we can use Nitsche's method or the method of L...
In most finite element (FE) codes contact is checked only at the nodes, corresponding to the use of ...
This work establishes a formal derivation of local projection stabilized methods as a result of an e...
Projection stabilization applied to general Lagrange multiplier finite element methods is introduced...
AbstractWe discuss the stabilization of finite element methods in which essential boundary condition...
This paper discusses a method of stabilizing Lagrange multiplier fields used to couple thin immersed...
In this paper we propose a class of jump-stabilized Lagrange multiplier methods for the finite-eleme...
peer reviewedWe introduce a new algorithm to define a stable Lagrange multiplier space to impose sti...
International audienceWe study a fictitious domain approach with Lagrange multipliers to dis-cretize...
peer reviewedThis paper introduces a new algorithm to define a stable Lagrange multiplier space to i...
This Ph.D. thesis was done in collaboration with "La Manufacture Française des Pneumatiques Michelin...
This is the pre-peer reviewed version of the following article: Tur, M., Albelda, J., Nadal, E. and ...
In this paper, we discuss a new stabilized Lagrange multiplier method for finite element solution of...
In this work we propose a stabilized nite element method that permits us to circumvent discrete inf-...
AbstractIn this work a local projection stabilization method is proposed for solving a fictitious do...
In the unfitted finite element methods, traditionally we can use Nitsche's method or the method of L...
In most finite element (FE) codes contact is checked only at the nodes, corresponding to the use of ...
This work establishes a formal derivation of local projection stabilized methods as a result of an e...
Projection stabilization applied to general Lagrange multiplier finite element methods is introduced...
AbstractWe discuss the stabilization of finite element methods in which essential boundary condition...
This paper discusses a method of stabilizing Lagrange multiplier fields used to couple thin immersed...
In this paper we propose a class of jump-stabilized Lagrange multiplier methods for the finite-eleme...
peer reviewedWe introduce a new algorithm to define a stable Lagrange multiplier space to impose sti...
International audienceWe study a fictitious domain approach with Lagrange multipliers to dis-cretize...
peer reviewedThis paper introduces a new algorithm to define a stable Lagrange multiplier space to i...
This Ph.D. thesis was done in collaboration with "La Manufacture Française des Pneumatiques Michelin...
This is the pre-peer reviewed version of the following article: Tur, M., Albelda, J., Nadal, E. and ...
In this paper, we discuss a new stabilized Lagrange multiplier method for finite element solution of...
In this work we propose a stabilized nite element method that permits us to circumvent discrete inf-...
AbstractIn this work a local projection stabilization method is proposed for solving a fictitious do...
In the unfitted finite element methods, traditionally we can use Nitsche's method or the method of L...
In most finite element (FE) codes contact is checked only at the nodes, corresponding to the use of ...
This work establishes a formal derivation of local projection stabilized methods as a result of an e...