Title :
Processes Distribution of Homogeneous Parallel Linear Algebra Routines on Heterogeneous Clusters
Author :
Cuenca, Javier ; Garcia, L.P. ; Giménez, Domingo ; Dongarra, Jack
Author_Institution :
Departamento de Ingenieria y Tecnologia de Computadores, Univ. de Murcia
Abstract :
This paper presents a self-optimization methodology for parallel linear algebra routines on heterogeneous systems. For each routine, a series of decisions is taken automatically in order to obtain an execution time close to the optimum (without rewriting the routine´s code). Some of these decisions are: the number of processes to generate, the heterogeneous distribution of these processes over the network of processors, the logical topology of the generated processes,... To reduce the search space of such decisions, different heuristics have been used. The experiments have been performed with a parallel LU factorization routine similar to the ScaLAPACK one, and good results have been obtained on different heterogeneous platforms
Keywords :
linear algebra; matrix decomposition; parallel algorithms; parallel programming; ScaLAPACK; heterogeneous clusters; homogeneous parallel linear algebra routines; logical topology; network of processors; parallel LU factorization routine; processes distribution; self-optimization methodology; Clustering algorithms; Computer science; Concurrent computing; Distributed computing; Lifting equipment; Linear algebra; Load management; Matrix decomposition; Multidimensional systems; Network topology;
Conference_Titel :
Cluster Computing, 2005. IEEE International
Conference_Location :
Burlington, MA
Print_ISBN :
0-7803-9486-0
Electronic_ISBN :
1552-5244
DOI :
10.1109/CLUSTR.2005.347021
