International audienceWe illustrate how the distributed parallel Algebraic Recursive Multilevel Solver based on MPI can be adapted for heterogeneous CPU/GPU architectures. The tasks performed on the GPU are related to the preconditioning of each part of the distributed matrix (local preconditioning) which is handled in the distributed version by each MPI process. The solving step remains on the CPU. In our implementation, the local preconditioning can be based either on the randomization of the last Schur complement system in the multilevel recursive process, or on an Incomplete LU factorization from the MAGMA library. Numerical experiments show that a promising performance improvement can be obtained using either randomized multilevel recu...
The starting point for this project was the iterative solution of sparse and block structured linear...
Massively-parallel devices of various architectures are being adopted by the newest supercomputers t...
Abstract. Algebraic multigrid methods for large, sparse linear systems are a necessity in many compu...
International audienceWe illustrate how the distributed parallel Algebraic Recursive Multilevel Solv...
The recently developed Parallel Algebraic Recursive Multilevel Solver (pARMS) is the subject of this...
The recently developed Parallel Algebraic Recursive Multilevel Solver (pARMS) is the subject of this...
In this PhD thesis, we address three challenges faced by linear algebra solvers in the perspective o...
The paper proposes a combination of the subdomain deflation method and local algebraic multigrid as ...
This paper discusses parGeMSLR, a C++/MPI software library for the solution of sparse systems of lin...
International audienceWe propose to use a randomization technique based on Random Butterfly Transfor...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Heterogeneity is emerging as one of the most challenging characteristics of today’s parallel environ...
The starting point for this project was the iterative solution of sparse and block structured linear...
Massively-parallel devices of various architectures are being adopted by the newest supercomputers t...
Abstract. Algebraic multigrid methods for large, sparse linear systems are a necessity in many compu...
International audienceWe illustrate how the distributed parallel Algebraic Recursive Multilevel Solv...
The recently developed Parallel Algebraic Recursive Multilevel Solver (pARMS) is the subject of this...
The recently developed Parallel Algebraic Recursive Multilevel Solver (pARMS) is the subject of this...
In this PhD thesis, we address three challenges faced by linear algebra solvers in the perspective o...
The paper proposes a combination of the subdomain deflation method and local algebraic multigrid as ...
This paper discusses parGeMSLR, a C++/MPI software library for the solution of sparse systems of lin...
International audienceWe propose to use a randomization technique based on Random Butterfly Transfor...
Many scientific applications require the solution of large and sparse linear systems of equations us...
Heterogeneity is emerging as one of the most challenging characteristics of today’s parallel environ...
The starting point for this project was the iterative solution of sparse and block structured linear...
Massively-parallel devices of various architectures are being adopted by the newest supercomputers t...
Abstract. Algebraic multigrid methods for large, sparse linear systems are a necessity in many compu...