Abstract—It is well known that the behavior of dense linear algebra algorithms is greatly influenced by factors like target architecture, underlying libraries and even problem size; because of this, the accurate prediction of their performance is a real challenge. In this article, we are not interested in creating accurate models for a given algorithm, but in correctly ranking a set of equivalent algorithms according to their performance. Aware of the hierarchical structure of dense linear algebra routines, we approach the problem by developing a framework for the automatic generation of statistical performance models for BLAS and LAPACK libraries. This allows us to obtain predictions through evaluating and combining such models. We demonst...
<p>Scientific Computation provides a critical role in the scientific process because it allows us as...
Dense linear algebra(DLA) is one of the most seven important kernels in high performance computing. ...
This paper discusses the scalability of Cholesky, LU, and QR factorization routines on MIMD distribu...
This dissertation introduces measurement-based performance modeling and prediction techniques for de...
This dissertation incorporates two research projects: performance modeling and prediction for dense ...
In this article we present a systematic approach to the derivation of families of high-performance a...
textOver the last two decades, much progress has been made in the area of the high-performance sequ...
We address some key issues in designing dense linear algebra (DLA) algorithms that are common for bo...
Abstract. We address some key issues in designing dense linear algebra (DLA) algorithms that are com...
Abstract. In this article we look at the generation of libraries for dense linear algebra operations...
Abstract In this document we present a new approach to developing sequential and parallel dense line...
The Multicomputer Toolbox includes sparse, dense, and iterative scalable linear algebra libraries. D...
International audienceIn this work, numerical algebraic operations are performed by using several li...
Expressions that involve matrices and vectors, known as linear algebra expressions, are commonly eva...
Expressions that involve matrices and vectors, known as linear algebra expressions, are commonly eva...
<p>Scientific Computation provides a critical role in the scientific process because it allows us as...
Dense linear algebra(DLA) is one of the most seven important kernels in high performance computing. ...
This paper discusses the scalability of Cholesky, LU, and QR factorization routines on MIMD distribu...
This dissertation introduces measurement-based performance modeling and prediction techniques for de...
This dissertation incorporates two research projects: performance modeling and prediction for dense ...
In this article we present a systematic approach to the derivation of families of high-performance a...
textOver the last two decades, much progress has been made in the area of the high-performance sequ...
We address some key issues in designing dense linear algebra (DLA) algorithms that are common for bo...
Abstract. We address some key issues in designing dense linear algebra (DLA) algorithms that are com...
Abstract. In this article we look at the generation of libraries for dense linear algebra operations...
Abstract In this document we present a new approach to developing sequential and parallel dense line...
The Multicomputer Toolbox includes sparse, dense, and iterative scalable linear algebra libraries. D...
International audienceIn this work, numerical algebraic operations are performed by using several li...
Expressions that involve matrices and vectors, known as linear algebra expressions, are commonly eva...
Expressions that involve matrices and vectors, known as linear algebra expressions, are commonly eva...
<p>Scientific Computation provides a critical role in the scientific process because it allows us as...
Dense linear algebra(DLA) is one of the most seven important kernels in high performance computing. ...
This paper discusses the scalability of Cholesky, LU, and QR factorization routines on MIMD distribu...
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