We illustrate how linear algebra calculations can be enhanced by statistical techniques in the case of a square linear system Ax = b. We study a random transformation of A that enables us to avoid pivoting and then to reduce the amount of communication. Numerical experiments show that this randomization can be performed at a very affordable computational price while providing us with a satisfying accuracy when compared to partial pivoting. This random transformation called Partial Random Butter y Transformation (PRBT) is optimized in terms of data storage and flops count. We propose a solver where PRBT and the LU factorization with no pivoting take advantage of the latest generation of hybrid multicore/GPU machines and we compare its Gfl op...
With a high probablilty our randomized augmentation of a matrix eliminates its rank defi-ciency and ...
We introduce a new technique called oblivious rounding-a variant of randomized rounding that avoids ...
We address some key issues in designing dense linear algebra (DLA) algorithms that are common for bo...
We illustrate how linear algebra calculations can be enhanced by statistical techniques in the case ...
International audienceWe illustrate how linear algebra calculations can be enhanced by statistical t...
International audienceWe present a fast hybrid solver for dense linear systems based on LU factoriza...
AbstractWe study several solvers for the solution of general linear systems where the main objective...
We study several solvers for the solution of general linear systems where the main objective is to r...
In this PhD thesis, we study algorithms and implementations to accelerate the solution of dense line...
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...
Our randomized preprocessing of a matrix by means of augmentation counters its degeneracy and ill co...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
With a high probablilty our randomized augmentation of a matrix eliminates its rank defi-ciency and ...
We introduce a new technique called oblivious rounding-a variant of randomized rounding that avoids ...
We address some key issues in designing dense linear algebra (DLA) algorithms that are common for bo...
We illustrate how linear algebra calculations can be enhanced by statistical techniques in the case ...
International audienceWe illustrate how linear algebra calculations can be enhanced by statistical t...
International audienceWe present a fast hybrid solver for dense linear systems based on LU factoriza...
AbstractWe study several solvers for the solution of general linear systems where the main objective...
We study several solvers for the solution of general linear systems where the main objective is to r...
In this PhD thesis, we study algorithms and implementations to accelerate the solution of dense line...
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...
Our randomized preprocessing of a matrix by means of augmentation counters its degeneracy and ill co...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
With a high probablilty our randomized augmentation of a matrix eliminates its rank defi-ciency and ...
We introduce a new technique called oblivious rounding-a variant of randomized rounding that avoids ...
We address some key issues in designing dense linear algebra (DLA) algorithms that are common for bo...