New block quadrature rules for the approximation of matrix functions

RODRIGUEZ, GIUSEPPE;
2016-01-01

Abstract

Golub and Meurant have shown how to use the symmetric block Lanczos algorithm to compute block Gauss quadrature rules for the approximation of certain matrix functions. We describe new block quadrature rules that can be computed by the symmetric or nonsymmetric block Lanczos algorithms and yield higher accuracy than standard block Gauss rules after the same number of steps of the symmetric or nonsymmetric block Lanczos algorithms. The new rules are block generalizations of the generalized averaged Gauss rules introduced by Spalevi´c. Applications to network analysis are presented
2016
2015
Inglese
502
1
299
326
28
WOS:000376796300014
2-s2.0-84938149730
Esperti anonimi
internazionale
scientifica
matrix funcions; Gauss quadrature; block Lanczos algoritm; complex networks
Reichel, L; Rodriguez, Giuseppe; Tang, T.
1.1 Articolo in rivista
info:eu-repo/semantics/article
1 Contributo su Rivista::1.1 Articolo in rivista
262
3
reserved
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