Open access
Datum
2000-12Typ
- Report
ETH Bibliographie
yes
Altmetrics
Abstract
Among the Lanczos-type product methods, which are characterized by residual polynomials $p_n t_n$ that are the product of the Lanczos polynomial $p_n$ and another polynomial $t_n$ of exact degree $n$ with $t_n(0) = 1$, Zhang's algorithm \GPBICG\ has the feature that the polynomials $t_n$ are implicitly built up by a pair of coupled two-term recurrences whose coefficients are chosen so that the new residual is minimized in a 2-dimensional space. There are several ways to achieve this. We discuss here alternative algorithms that are mathematically equivalent (that is, produce in exact arithmetic the same results). The goal is to find one where the ultimate accuracy of the iterates $x_n$ is guaranteed to be high and the cost is at most slightly increased. Mehr anzeigen
Persistenter Link
https://doi.org/10.3929/ethz-a-004288984Publikationsstatus
publishedExterne Links
Zeitschrift / Serie
SAM Research ReportBand
Verlag
Seminar for Applied Mathematics, ETH ZurichThema
Krylov space method; biconjugate gradients; Lanczos-type product method; BiCGxMR2; GPBi-CGOrganisationseinheit
02501 - Seminar für Angewandte Mathematik / Seminar for Applied Mathematics
Anmerkungen
Dedicated to the memory of Rüdiger Weiss.ETH Bibliographie
yes
Altmetrics