Add to ORKGAbstract. Finite element discretizations of multiphysics problems frequently give rise to block-structured linear algebra problems that require effective preconditioners. We build two classes of preconditioners in the spirit of well-known block factorizations [21, 16] and apply these to the diffusive portion of the bidomain equations and the Bénard convection problem. An abstract generalized eigenvalue problem allows us to give application-specific bounds for the real parts of eigenvalues for these two problems. This analysis is accompanied by numerical calculations with several interesting features. One of our preconditioners for the bidomain equations converges in five iterations for a range of problem sizes. For Bénard convection, we o...
We introduce a class of block preconditioners for accelerating the iterative solution of coupled por...
Eigenvalues of smallest magnitude become a major bottleneck for iterative solvers especially when th...
The solution of ordinary and partial differential equations using implicit linear multistep formulas...
Recent developments in DOLFINx allow for the block assembly of linear algebraic systems arising from...
Recently, the authors presented different block preconditioners for implicit Runge-Kutta discretizat...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
Block constraint preconditioners are a most recent development for the iterative solution to large-s...
AbstractWe study some properties of block-circulant preconditioners for high-order compact approxima...
In nuclear engineering, the λ -modes associated with the neutron diffusion equation are ...
Two parallel and scalable multilevel preconditioners for the Bidomain system in computational elect...
Domain decomposition methods (DDM) are often chosen to precondition sparse linear systems of equatio...
We propose new classes of preconditioners for the linear systems arising from a boundary integral eq...
Abstract. In this paper, we revisit an auxiliary space preconditioning method proposed by Xu [Comput...
In this thesis we revisit theoretical background for spacetime boundary element methods for the hea...
This article considers the iterative solution of a finite element discretization of the magma dynam...
We introduce a class of block preconditioners for accelerating the iterative solution of coupled por...
Eigenvalues of smallest magnitude become a major bottleneck for iterative solvers especially when th...
The solution of ordinary and partial differential equations using implicit linear multistep formulas...
Recent developments in DOLFINx allow for the block assembly of linear algebraic systems arising from...
Recently, the authors presented different block preconditioners for implicit Runge-Kutta discretizat...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
Block constraint preconditioners are a most recent development for the iterative solution to large-s...
AbstractWe study some properties of block-circulant preconditioners for high-order compact approxima...
In nuclear engineering, the λ -modes associated with the neutron diffusion equation are ...
Two parallel and scalable multilevel preconditioners for the Bidomain system in computational elect...
Domain decomposition methods (DDM) are often chosen to precondition sparse linear systems of equatio...
We propose new classes of preconditioners for the linear systems arising from a boundary integral eq...
Abstract. In this paper, we revisit an auxiliary space preconditioning method proposed by Xu [Comput...
In this thesis we revisit theoretical background for spacetime boundary element methods for the hea...
This article considers the iterative solution of a finite element discretization of the magma dynam...
We introduce a class of block preconditioners for accelerating the iterative solution of coupled por...
Eigenvalues of smallest magnitude become a major bottleneck for iterative solvers especially when th...
The solution of ordinary and partial differential equations using implicit linear multistep formulas...