Funktionalungleichungen und Iterationsverfahren

Kornstaedt, Hans-Joachim

doi:10.1007/BF01834116

Funktionalungleichungen und Iterationsverfahren

Research papers
Published: February 1975

Volume 13, pages 21–45, (1975)
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Hans-Joachim Kornstaedt¹

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Abstract

This paper is concerned with a class of iterative processes of the formu _k+1 =Tu _k (k = 0, 1, ⋯) for solving nonlinear operator equationsu = Tu orFu = 0. By studying the relationship between a linear functional inequalityϕ(Ah) β(h) + γ(h) ⩽ ϕ(h) and estimates for the iteration operatorT a general semilocal convergence theorem is obtained. The theorem contains as special cases theorems for various iterative methods. Numerical examples illustrate the accuracy of the error estimates for the approximationu _k.

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Technische Universität Berlin, West Germany
Hans-Joachim Kornstaedt

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Kornstaedt, HJ. Funktionalungleichungen und Iterationsverfahren. Aeq. Math. 13, 21–45 (1975). https://doi.org/10.1007/BF01834116

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Received: 15 January 1973
Accepted: 25 July 1973
Issue Date: February 1975
DOI: https://doi.org/10.1007/BF01834116

AMS Primary Subject Classification

65J05

Secondary Subject Classification

39A25

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Funktionalungleichungen und Iterationsverfahren

Abstract

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Larger convergence regions for an efficient two-step iterative method

Extended local convergence for some inexact methods with applications

Always convergent iteration methods for nonlinear equations of Lipschitz functions

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Funktionalungleichungen und Iterationsverfahren

Abstract

Access this article

Similar content being viewed by others

Larger convergence regions for an efficient two-step iterative method

Extended local convergence for some inexact methods with applications

Always convergent iteration methods for nonlinear equations of Lipschitz functions

Literatur

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Authors and Affiliations

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About this article

Cite this article

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