Title :
Parallel windowed block recursive least squares
Author :
Bojanczyk, Adam W
Abstract :
We report results on the parallel implementation of accurate algorithms for the windowed recursive least squares (WRLS) problem. In this problem both updating and downdating of matrix factorizations takes place, where in either case, the factorization is modified by a block of rows. We consider two algorithms, block Gram-Schmidt with re-orthogonalization (BGSR) (S.J. Olszanskyj et al.) and corrected semi-normal equations (CSNE) (L. Elden, H. Park, 1992). We implemented the algorithms for the Intel iPSC/860 Hypercube and Intel Paragon XP/S architectures. Test results show that even though the BGSR algorithm has more work to do, it exhibits better scaled speedup and is in many scenarios faster than CSNE in parallel
Keywords :
hypercube networks; least squares approximations; mathematics; mathematics computing; matrix algebra; parallel algorithms; parallel machines; BGSR; CSNE; Intel Paragon XP/S architectures; Intel iPSC/860 Hypercube; WRLS problem; block Gram-Schmidt with re-orthogonalization; corrected semi-normal equations; matrix factorizations; parallel implementation; parallel windowed block recursive least squares; windowed recursive least squares problem; Algorithm design and analysis; Differential equations; Error correction; Least squares methods; Matrices; Refining; Resonance light scattering; Robustness;
Conference_Titel :
Scalable High-Performance Computing Conference, 1994., Proceedings of the
Conference_Location :
Knoxville, TN
Print_ISBN :
0-8186-5680-8
DOI :
10.1109/SHPCC.1994.296715
