International audienceWe present parallel and sequential dense QR factorization algorithms that are both optimal (up to polylogarithmic factors) in the amount of communication they perform and just as stable as Householder QR. We prove optimality by deriving new lower bounds for the number of multiplications done by "non-Strassen-like" QR, and using these in known communication lower bounds that are proportional to the number of multiplications. We not only show that our QR algorithms attain these lower bounds (up to polylogarithmic factors), but that existing LAPACK and ScaLAPACK algorithms perform asymptotically more communication. We derive analogous communication lower bounds for LU factorization and point out recent LU algorithms in th...
In this paper, we analyse and compare the techniques of algorithmic blocking and (storage blocking w...
AbstractThis paper gives improved parallel methods for several exact factorizations of some classes ...
This dissertation focuses on a widely used linear algebra kernel to solve linear systems, that is th...
International audienceWe present parallel and sequential dense QR factorization algorithms that are ...
International audienceIn this paper we study the performance of two classical dense linear algebra a...
The solution of dense systems of linear equations is at the heart of numerical computations. Such sy...
This study focuses on the performance of two classical dense linear algebra algorithms, the LU and t...
International audienceThis paper introduces hybrid LU-QR algorithms for solving dense linear sys-tem...
Abstract. In this paper we introduce CARRQR, a communication avoiding rank revealing QR factorizatio...
Dense linear algebra computations are essential to nearly every problem in scientific computing and ...
International audienceTo exploit the potential of multicore architectures, recent dense linear algeb...
This paper presents some works on the LU factorization from the ScaLAPACK library. First, a complexi...
The increasing complexity of modern computer architectures has greatly influenced algorithm design. ...
This manuscript focuses on the development of a parallel QR-factorization of structured rank matrice...
International audienceAs multicore systems continue to gain ground in the high‐performance computing...
In this paper, we analyse and compare the techniques of algorithmic blocking and (storage blocking w...
AbstractThis paper gives improved parallel methods for several exact factorizations of some classes ...
This dissertation focuses on a widely used linear algebra kernel to solve linear systems, that is th...
International audienceWe present parallel and sequential dense QR factorization algorithms that are ...
International audienceIn this paper we study the performance of two classical dense linear algebra a...
The solution of dense systems of linear equations is at the heart of numerical computations. Such sy...
This study focuses on the performance of two classical dense linear algebra algorithms, the LU and t...
International audienceThis paper introduces hybrid LU-QR algorithms for solving dense linear sys-tem...
Abstract. In this paper we introduce CARRQR, a communication avoiding rank revealing QR factorizatio...
Dense linear algebra computations are essential to nearly every problem in scientific computing and ...
International audienceTo exploit the potential of multicore architectures, recent dense linear algeb...
This paper presents some works on the LU factorization from the ScaLAPACK library. First, a complexi...
The increasing complexity of modern computer architectures has greatly influenced algorithm design. ...
This manuscript focuses on the development of a parallel QR-factorization of structured rank matrice...
International audienceAs multicore systems continue to gain ground in the high‐performance computing...
In this paper, we analyse and compare the techniques of algorithmic blocking and (storage blocking w...
AbstractThis paper gives improved parallel methods for several exact factorizations of some classes ...
This dissertation focuses on a widely used linear algebra kernel to solve linear systems, that is th...