Many applications in structural mechanics require the numerical solution of sequences of linear systems typically issued from a finite element discretization of the governing equations on fine meshes. The method of Lagrange multipliers is often used to take into account mechanical constraints. The resulting matrices then exhibit a saddle point structure and the iterative solution of such preconditioned linear systems is considered as challenging. A popular strategy is then to combine preconditioning and deflation to yield an efficient method.We propose an alternative that is applicable to the general case and not only to matrices with a saddle point structure. In this approach, we consider to update an existing algebraic or application-base...
We are concerned with the iterative solution of linear systems with multiple right-hand sides availa...
International audienceThe cohesive zone modelling (CZM) is extensively used for the simulation of de...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...
This paper presents a class of limited memory preconditioners (LMPs) for solving linear systems of ...
Tying non-matching meshes is needed in many instances of finite element mod- eling. Multiple techniq...
This article presents and validates a general framework to build a linear dynamic Finite Element-bas...
In this work we extend the results of a high order finite volume semi-discretization for port-Hamilt...
A port-Hamiltonian formulation for general linear coupled thermoelasticity and for the thermoelastic...
Given a full-rank matrix $A \in \mathbb{R}^{m\times n}$ ($m\geq n$), we consider a special class of ...
La thèse a pour objectif le développement de méthodes performantes pour la résolution de problèmes n...
Least squares form one of the most prominent classes of optimization problems, with numerous applica...
Viscoelastic materials are often characterized by a completely monotone kernel : this gives rise to ...
Quaternion algebra is frequently employed for spacecraft attitude description due to its convenient ...
This thesis presents a work on iterative methods for solving linear systems that aim at reducing the...
International audienceThis work proposes an improvement to existing methods based on modal expansion...
We are concerned with the iterative solution of linear systems with multiple right-hand sides availa...
International audienceThe cohesive zone modelling (CZM) is extensively used for the simulation of de...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...
This paper presents a class of limited memory preconditioners (LMPs) for solving linear systems of ...
Tying non-matching meshes is needed in many instances of finite element mod- eling. Multiple techniq...
This article presents and validates a general framework to build a linear dynamic Finite Element-bas...
In this work we extend the results of a high order finite volume semi-discretization for port-Hamilt...
A port-Hamiltonian formulation for general linear coupled thermoelasticity and for the thermoelastic...
Given a full-rank matrix $A \in \mathbb{R}^{m\times n}$ ($m\geq n$), we consider a special class of ...
La thèse a pour objectif le développement de méthodes performantes pour la résolution de problèmes n...
Least squares form one of the most prominent classes of optimization problems, with numerous applica...
Viscoelastic materials are often characterized by a completely monotone kernel : this gives rise to ...
Quaternion algebra is frequently employed for spacecraft attitude description due to its convenient ...
This thesis presents a work on iterative methods for solving linear systems that aim at reducing the...
International audienceThis work proposes an improvement to existing methods based on modal expansion...
We are concerned with the iterative solution of linear systems with multiple right-hand sides availa...
International audienceThe cohesive zone modelling (CZM) is extensively used for the simulation of de...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...