Two-sided and alternating Jacobi-Davidson
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Publication date
2001-06-01
Authors
Hochstenbach, Michiel Erik
Sleijpen, G.L.G.
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Document Type
Preprint
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Abstract
We discuss two variants of a two-sided Jacobi-Davidson method, which have asymptotically
cubic convergence for nonnormal matrices and aim to find both right and left eigenvectors.
These methods can be seen as Jacobi-Davidson analogs of Ostrowskis two-sided Rayleigh Quotient
Iteration. Some relations between (exact and inexact) two-sided Jacobi-Davidson and (exact and
inexact) two-sided Rayleigh Quotient Iteration are given, together with convergence rates.
Furthermore, we introduce an alternating Jacobi-Davidson process, that can be seen as the
Jacobi-Davidson analog of Parletts alternating Rayleigh Quotient Iteration. The methods are extended
to the generalized and polynomial eigenproblem. Advantages of the methods are illustrated
by numerical examples.
Keywords
JacobiDavidson, Rayleigh Quotient Iteration, Ostrowskis two-sided Rayleigh Quotient Iteration, Parletts alternating Rayleigh Quotient Iteration, two-sided Lanczos, correction equation, nonnormal matrix, inexact accelerated Newton method, rate of convergence, generalized eigenproblem, polynomial eigenproblem