Geometric multigrid solvers within adaptive mesh refinement (AMR) applications often reach a point where further coarsening of the grid becomes impractical as individual sub domain sizes approach unity. At this point the most common solution is to use a bottom solver, such as BiCGStab, to reduce the residual by a fixed factor at the coarsest level. Each iteration of BiCGStab requires multiple global reductions (MPI collectives). As the number of BiCGStab iterations required for convergence grows with problem size, and the time for each collective operation increases with machine scale, bottom solves in large-scale applications can constitute a significant fraction of the overall multigrid solve time. In this paper, we implement, evaluate, a...
Computational fluid-structure interaction is commonly performed using a partitioned approach. For st...
In modern large-scale supercomputing applications, Algebraic Multigrid (AMG) is a leading choice for...
In this report we present parallel solvers for large linear systems arising from the finite-element ...
Geometric multigrid solvers within adaptive mesh refinement (AMR) applications often reach a point w...
Talk overview • Coarse grid solver (“bottom solver”) often the bottleneck in geometric multigrid met...
Many scientific applications require the solution of large and sparse linear systems of equations us...
International audienceIn basin and reservoir simulations, the most expensive and time consuming phas...
A major challenge in undertaking high resolution numerical simulations for engineering problems come...
International audienceKrylov methods are widely used for solving large sparse linear systems of equa...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
The Algebraic Multigrid (AMG) method has over the years developed into an ecient tool for solving un...
Topology optimization is a powerful tool for global and multiscale design of structures, microstruct...
In this work, we analyze the scalability of inexact two-level balancing domain decomposition by cons...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Multigrid methods are widely used to accelerate the convergence of iterative solvers for linear syst...
Computational fluid-structure interaction is commonly performed using a partitioned approach. For st...
In modern large-scale supercomputing applications, Algebraic Multigrid (AMG) is a leading choice for...
In this report we present parallel solvers for large linear systems arising from the finite-element ...
Geometric multigrid solvers within adaptive mesh refinement (AMR) applications often reach a point w...
Talk overview • Coarse grid solver (“bottom solver”) often the bottleneck in geometric multigrid met...
Many scientific applications require the solution of large and sparse linear systems of equations us...
International audienceIn basin and reservoir simulations, the most expensive and time consuming phas...
A major challenge in undertaking high resolution numerical simulations for engineering problems come...
International audienceKrylov methods are widely used for solving large sparse linear systems of equa...
Abstract—Krylov subspace solvers are often the method of choice when solving sparse linear systems i...
The Algebraic Multigrid (AMG) method has over the years developed into an ecient tool for solving un...
Topology optimization is a powerful tool for global and multiscale design of structures, microstruct...
In this work, we analyze the scalability of inexact two-level balancing domain decomposition by cons...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Multigrid methods are widely used to accelerate the convergence of iterative solvers for linear syst...
Computational fluid-structure interaction is commonly performed using a partitioned approach. For st...
In modern large-scale supercomputing applications, Algebraic Multigrid (AMG) is a leading choice for...
In this report we present parallel solvers for large linear systems arising from the finite-element ...