International audienceThis paper focuses on the resolution of a large number of small symmetric linear systems and its parallel implementation on single precision on GPUs. The computations involved by each linear system are independent from the others and the number of unknowns does not exceed 64. For this purpose, we present the adaptation to our context of largely used methods that include: LDLt, House-holder reduction to a tridiagonal matrix, parallel cyclic reduction that is not a power of two and the divide and conquer algorithm for tridiagonal eigenprob-lems. We not only detail the implementation and optimization of each method but we also compare the sustainability of each solution and its performance which include both parallel comp...
The original publication is available at www.springerlink.comInternational audienceA wide class of g...
The present work presents a strategy to increase the arithmetic intensity of the solvers. Namely, we...
We describe an efficient and innovative parallel tiled algorithm for solving symmetric indefinite sy...
International audienceThis paper focuses on the resolution of a large number of small symmetric line...
In this "Habilitation à Diriger des Recherches" (HDR), we present our research in high-performance s...
We illustrate how linear algebra calculations can be enhanced by statistical techniques in the case ...
This dissertation proposes a new technique for efficient parallel solution of very large linear syst...
We study the performance of three parallel algorithms and their hybrid variants for solving tridiago...
In this paper we address the reduction of a dense matrix to tridiagonal form for the solution of sym...
Tridiagonal diagonally dominant linear systems arise in many scientific and engineering applications...
Banded linear systems with large bandwidths can be solved by similar methods as full linear systems....
International audienceThis paper studies the performance of different algorithms for solving a dense...
International audienceWe illustrate how linear algebra calculations can be enhanced by statistical t...
This thesis contributes to the field of sparse linear algebra, graph applications, and preconditione...
AbstractThe solution of linear systems continues to play an important role in scientific computing. ...
The original publication is available at www.springerlink.comInternational audienceA wide class of g...
The present work presents a strategy to increase the arithmetic intensity of the solvers. Namely, we...
We describe an efficient and innovative parallel tiled algorithm for solving symmetric indefinite sy...
International audienceThis paper focuses on the resolution of a large number of small symmetric line...
In this "Habilitation à Diriger des Recherches" (HDR), we present our research in high-performance s...
We illustrate how linear algebra calculations can be enhanced by statistical techniques in the case ...
This dissertation proposes a new technique for efficient parallel solution of very large linear syst...
We study the performance of three parallel algorithms and their hybrid variants for solving tridiago...
In this paper we address the reduction of a dense matrix to tridiagonal form for the solution of sym...
Tridiagonal diagonally dominant linear systems arise in many scientific and engineering applications...
Banded linear systems with large bandwidths can be solved by similar methods as full linear systems....
International audienceThis paper studies the performance of different algorithms for solving a dense...
International audienceWe illustrate how linear algebra calculations can be enhanced by statistical t...
This thesis contributes to the field of sparse linear algebra, graph applications, and preconditione...
AbstractThe solution of linear systems continues to play an important role in scientific computing. ...
The original publication is available at www.springerlink.comInternational audienceA wide class of g...
The present work presents a strategy to increase the arithmetic intensity of the solvers. Namely, we...
We describe an efficient and innovative parallel tiled algorithm for solving symmetric indefinite sy...