Recent computational developments in Krylov subspace methods for linear systems

Recent computational developments in Krylov subspace methods for linear systems (2007)

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by Valeria Simoncini , Daniel B. Szyld

Venue:	NUMER. LINEAR ALGEBRA APPL
Citations:	26 - 7 self

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@ARTICLE{Simoncini07recentcomputational,
    author = {Valeria Simoncini and Daniel B. Szyld},
    title = {Recent computational developments in Krylov subspace methods for linear systems},
    journal = {NUMER. LINEAR ALGEBRA APPL},
    year = {2007},
    volume = {14},
    pages = {1--59}
}

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Abstract

Many advances in the development of Krylov subspace methods for the iterative solution of linear systems during the last decade and a half are reviewed. These new developments include different versions of restarted, augmented, deflated, flexible, nested, and inexact methods. Also reviewed are methods specifically tailored to systems with special properties such as special forms of symmetry and those depending on one or more parameters.

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