Add to ORKGPreconditioned iterative methods for the indefinite systems obtained by discretizing the linear elasticity and Stokes problems with mixed spectral elements in three dimensions are introduced and analyzed. The resulting stiffness matrices have the structure of saddle point problems with a penalty term, which is associated with the Poisson ratio for elasticity problems or with stabilization techniques for Stokes problems. The main results of this paper show that the convergence rate of the resulting algorithms is independent of the penalty parameter, the number of spectral elements N and mildly dependent on the spectral degree n via the inf-sup constant. The preconditioners proposed for the whole indefinite system are block-diagonal and block...
Two different preconditioners for symmetric saddle point problems with a penalty term are analyzed. ...
In this work, prestressed elasticity problem as a model of the so-called glacial isostatic adjustmen...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
Supported by CNR and by the National Science Foundation under Grant NSF-CCR-9503408, and in part by ...
This work was supported by I.A.N.-CNR, Pavia and by the National Science Foundation under Grant NSF-...
A block-diagonal preconditioner with the minimal residual method and an approximate block-factorizat...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
The classical overlapping Schwarz algorithm is here extended to the spectral element discretization ...
AbstractA parameterized preconditioning framework is proposed to improve the conditions of the gener...
International audienceIn this paper, we present a mixed formulation of a spectral element approximat...
We introduce and study a class of overlapping domain decomposition preconditioners for saddle point ...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
Discretizations of partial differential equations by mixed finite element methods result in large sa...
AbstractIn this paper we propose preconditioners for spectral element methods for elliptic and parab...
Two different preconditioners for symmetric saddle point problems with a penalty term are analyzed. ...
In this work, prestressed elasticity problem as a model of the so-called glacial isostatic adjustmen...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
Iterative substructuring methods are introduced and analyzed for saddle point problems with a penalt...
Supported by CNR and by the National Science Foundation under Grant NSF-CCR-9503408, and in part by ...
This work was supported by I.A.N.-CNR, Pavia and by the National Science Foundation under Grant NSF-...
A block-diagonal preconditioner with the minimal residual method and an approximate block-factorizat...
We present a mixed formulation for high-order spectral/hp element methods and investigate its stabil...
The classical overlapping Schwarz algorithm is here extended to the spectral element discretization ...
AbstractA parameterized preconditioning framework is proposed to improve the conditions of the gener...
International audienceIn this paper, we present a mixed formulation of a spectral element approximat...
We introduce and study a class of overlapping domain decomposition preconditioners for saddle point ...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
Discretizations of partial differential equations by mixed finite element methods result in large sa...
AbstractIn this paper we propose preconditioners for spectral element methods for elliptic and parab...
Two different preconditioners for symmetric saddle point problems with a penalty term are analyzed. ...
In this work, prestressed elasticity problem as a model of the so-called glacial isostatic adjustmen...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...