Many scientific applications require the solution of large and sparse linear systems of equations using Krylov subspace methods; in this case, the choice of an effective preconditioner may be crucial for the convergence of the Krylov solver. Algebraic MultiGrid (AMG) methods are widely used as preconditioners, because of their optimal computational cost and their algorithmic scalability. The wide availability of GPUs, now found in many of the fastest supercomputers, poses the problem of implementing efficiently these methods on high-throughput processors. In this work we focus on the application phase of AMG preconditioners, and in particular on the choice and implementation of smoothers and coarsest-level solvers capable of exploiting the ...
Algebraic multigrid (AMG) is a popular iterative solver and preconditioner for large sparse linear s...
Fully implicit petroleum reservoir simulations result in huge, often very ill-conditioned linear sys...
This article has two main objectives: one is to describe some extensions of an adaptive Algebraic Mu...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Algebraic multigrid (AMG) is a very efficient iterative solver and preconditioner for large unstruct...
We describe main issues and design principles of an efficient implementation, tailored to recent gen...
We present an efficient, robust and fully GPU-accelerated aggregation-based al-gebraic multigrid pre...
Linear solvers for large and sparse systems are a key element of scientific applications, and their ...
Linear solvers for large and sparse systems are a key element of scientific applications, and their ...
The development of high performance, massively parallel computers and the increasing demands of comp...
Abstract. Linear systems are required to solve in many scientific applications and the solution of t...
Simulation with models based on partial differential equations often requires the solution of (seque...
The final publication is available at Springer via http://dx.doi.org/10.1134/S1995080220040071The pa...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In modern large-scale supercomputing applications, Algebraic Multigrid (AMG) is a leading choice for...
Algebraic multigrid (AMG) is a popular iterative solver and preconditioner for large sparse linear s...
Fully implicit petroleum reservoir simulations result in huge, often very ill-conditioned linear sys...
This article has two main objectives: one is to describe some extensions of an adaptive Algebraic Mu...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Algebraic multigrid (AMG) is a very efficient iterative solver and preconditioner for large unstruct...
We describe main issues and design principles of an efficient implementation, tailored to recent gen...
We present an efficient, robust and fully GPU-accelerated aggregation-based al-gebraic multigrid pre...
Linear solvers for large and sparse systems are a key element of scientific applications, and their ...
Linear solvers for large and sparse systems are a key element of scientific applications, and their ...
The development of high performance, massively parallel computers and the increasing demands of comp...
Abstract. Linear systems are required to solve in many scientific applications and the solution of t...
Simulation with models based on partial differential equations often requires the solution of (seque...
The final publication is available at Springer via http://dx.doi.org/10.1134/S1995080220040071The pa...
With the breakdown of Dennard scaling in the mid-2000s and the end of Moore's law on the horizon, th...
In modern large-scale supercomputing applications, Algebraic Multigrid (AMG) is a leading choice for...
Algebraic multigrid (AMG) is a popular iterative solver and preconditioner for large sparse linear s...
Fully implicit petroleum reservoir simulations result in huge, often very ill-conditioned linear sys...
This article has two main objectives: one is to describe some extensions of an adaptive Algebraic Mu...