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TPDS
2010

Parallel Two-Sided Matrix Reduction to Band Bidiagonal Form on Multicore Architectures

13 years 10 months ago
Parallel Two-Sided Matrix Reduction to Band Bidiagonal Form on Multicore Architectures
The objective of this paper is to extend, in the context of multicore architectures, the concepts of tile algorithms [Buttari et al., 2007] for Cholesky, LU, QR factorizations to the family of two-sided factorizations. In particular, the bidiagonal reduction of a general, dense matrix is very often used as a pre-processing step for calculating the Singular Value Decomposition. Furthermore, in the Top500 list of June 2008, 98% of the fastest parallel systems in the world were based on multicores. This confronts the scientific software community with both a daunting challenge and a unique opportunity. The challenge arises from the disturbing mismatch between the design of systems based on this new chip architecture – hundreds of thousands of nodes, a million or more cores, reduced bandwidth and memory available to cores – and the components of the traditional software stack, such as numerical libraries, on which scientific applications have relied for their accuracy and performance...
Hatem Ltaief, Jakub Kurzak, Jack Dongarra
Added 31 Jan 2011
Updated 31 Jan 2011
Type Journal
Year 2010
Where TPDS
Authors Hatem Ltaief, Jakub Kurzak, Jack Dongarra
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