Computing a matrix polynomial is the basic process in the calculation of functions of matrices by the Taylor method. One of the most efficient techniques for computing matrix polynomials is based on the Paterson– Stockmeyer method. Inspired by this method, we propose in this work a recursive algorithm and an efficient implementation that exploit the heterogeneous nature of current computers to evaluate large scale matrix polynomials is the shortest possible time. Heterogeneous computers are those which have any type of hardware accelerator(s). For these type of computers, we propose a method to easily implement efficient algorithms that use several hardware accelerators in parallel. This methodology is built on the last versions of the Open...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
In this article the authors develop some algorithms and tools for solving matrix problems on paralle...
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...
Proceedings of: Third International Workshop on Sustainable Ultrascale Computing Systems (NESUS 2016...
The main goal of this research is to use OpenMP, Posix Threads and Microsoft Parallel Patterns libra...
AbstractIn this paper, several algorithms for the matrix polynomial division are taken into consider...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
International audiencePolynomials are mathematical algebraic structures that play a great role in sc...
International audienceFinding the roots of polynomials is a very important part of solving real-life...
AbstractThis paper describes a new algorithm for computing linear generators (vector generating poly...
Abstract. We present fast and highly scalable parallel computations for a number of important and fu...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 22495, issue : a.1996 n....
Parallel computing on networks of workstations are intensively used in some application areas such a...
The article describes the matrix algebra libraries based on the modern technologies of parallel prog...
An efficient algorithm for evaluating the matrix polynomial I+A+A2+…+AN-1 is developed. The proposed...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
In this article the authors develop some algorithms and tools for solving matrix problems on paralle...
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...
Proceedings of: Third International Workshop on Sustainable Ultrascale Computing Systems (NESUS 2016...
The main goal of this research is to use OpenMP, Posix Threads and Microsoft Parallel Patterns libra...
AbstractIn this paper, several algorithms for the matrix polynomial division are taken into consider...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
International audiencePolynomials are mathematical algebraic structures that play a great role in sc...
International audienceFinding the roots of polynomials is a very important part of solving real-life...
AbstractThis paper describes a new algorithm for computing linear generators (vector generating poly...
Abstract. We present fast and highly scalable parallel computations for a number of important and fu...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 22495, issue : a.1996 n....
Parallel computing on networks of workstations are intensively used in some application areas such a...
The article describes the matrix algebra libraries based on the modern technologies of parallel prog...
An efficient algorithm for evaluating the matrix polynomial I+A+A2+…+AN-1 is developed. The proposed...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
In this article the authors develop some algorithms and tools for solving matrix problems on paralle...
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...