On the convergence of Krylov methods with low-rank truncations

On the convergence of Krylov methods with low-rank truncations

Low-rank Krylov methods are one of the few options available in the literature to address the numerical solution of large-scale general linear matrix equations. These routines amount to well-known Krylov schemes that have been equipped with a couple of low-rank truncations to maintain a feasible sto...

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Veröffentlicht in:Numerical algorithms 2021-11, Vol.88 (3), p.1383-1417
Hauptverfasser: Palitta, Davide, Kürschner, Patrick
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Algorithms
Approximation
Computer Science
Convergence
Fluid-structure interaction
Mathematical analysis
Memory
Methods
Numeric Computing
Numerical Analysis
Original Paper
System theory
Theory of Computation
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Zusammenfassung:Low-rank Krylov methods are one of the few options available in the literature to address the numerical solution of large-scale general linear matrix equations. These routines amount to well-known Krylov schemes that have been equipped with a couple of low-rank truncations to maintain a feasible storage demand in the overall solution procedure. However, such truncations may affect the convergence properties of the adopted Krylov method. In this paper we show how the truncation steps have to be performed in order to maintain the convergence of the Krylov routine. Several numerical experiments validate our theoretical findings.
ISSN:1017-1398
1572-9265
DOI:10.1007/s11075-021-01080-2