The divide-and-conquer paradigm of iterative domain decomposition, or substructuring, has become a practical tool in computational fluid dynamic applications because of its flexibility in accommodating adaptive refinement through locally uniform (or quasi-uniform) grids, its ability to exploit multiple discretizations of the operator equations, and the modular pathway it provides towards parallelism. These features are illustrated on the classic model problem of flow over a backstep using Newton's method as the nonlinear iteration. Multiple discretizations (second-order in the operator and first-order in the preconditioner) and locally uniform mesh refinement pay dividends separately, and they can be combined synergistically. Sample perform...
Increasingly large scale computations are using unstructured discrete computational grids. A typica...
Direct solvers currently dominate commercial finite element structural software, but do not scale we...
AbstractWithin the FETI domain decomposition method applied to nonsymmetric linear systems, a generi...
This two-part paper presents the results of a benchmarked analytical-numerical investigation into th...
This thesis is concerned with linear and non-linear optimal flow control problems which are modeled ...
In the past several years, domain decomposition was a very popular topic, partly motivated by the po...
The performance was tested of five different interface preconditionings for domain decomposed convec...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
Phase 1 is complete for the development of a computational fluid dynamics CFD) parallel code with au...
The study deals with the parallelization of finite element based Navier-Stokes codes using domain de...
The focus of the subject DOE sponsored research concerns parallel methods, algorithms, and software ...
When solving time-dependent partial differential equations on parallel computers using the nonoverla...
AbstractWhen solving time-dependent partial differential equations on parallel computers using the n...
Newton-Krylov methods and Krylov-Schwarz (domain decomposition) methods have begun to become establi...
Recently, a new iterative domain-decomposition method has been developed which has been used to solv...
Increasingly large scale computations are using unstructured discrete computational grids. A typica...
Direct solvers currently dominate commercial finite element structural software, but do not scale we...
AbstractWithin the FETI domain decomposition method applied to nonsymmetric linear systems, a generi...
This two-part paper presents the results of a benchmarked analytical-numerical investigation into th...
This thesis is concerned with linear and non-linear optimal flow control problems which are modeled ...
In the past several years, domain decomposition was a very popular topic, partly motivated by the po...
The performance was tested of five different interface preconditionings for domain decomposed convec...
International audienceWe consider the solving of linear systems arising from porous media flow simul...
Phase 1 is complete for the development of a computational fluid dynamics CFD) parallel code with au...
The study deals with the parallelization of finite element based Navier-Stokes codes using domain de...
The focus of the subject DOE sponsored research concerns parallel methods, algorithms, and software ...
When solving time-dependent partial differential equations on parallel computers using the nonoverla...
AbstractWhen solving time-dependent partial differential equations on parallel computers using the n...
Newton-Krylov methods and Krylov-Schwarz (domain decomposition) methods have begun to become establi...
Recently, a new iterative domain-decomposition method has been developed which has been used to solv...
Increasingly large scale computations are using unstructured discrete computational grids. A typica...
Direct solvers currently dominate commercial finite element structural software, but do not scale we...
AbstractWithin the FETI domain decomposition method applied to nonsymmetric linear systems, a generi...