A method for obtaining third-order iterative formulas.
Herceg, Djordje, Herceg, Dragoslav (2008)
Novi Sad Journal of Mathematics
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Displaying similar documents to “A Note on the “Constructing” of Nonstationary Methods for Solving Nonlinear Equations with Raised Speed of Convergence”
A method for obtaining third-order iterative formulas.
Enclosing roots of polynomial equations and their applications to iterative processes.
Argyros, I.K., Hilout, S. (2009)
Surveys in Mathematics and its Applications
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Newton-like algorithms for kth root calculation
Marek Kuczma, Halina Światak (1991)
Annales Polonici Mathematici
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Increase of iteration's order.
Benkő, József, Klincsik, Mihály (1999)
Mathematica Pannonica
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Extending the applicability of Newton's method using nondiscrete induction
Ioannis K. Argyros, Saïd Hilout (2013)
Czechoslovak Mathematical Journal
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We extend the applicability of Newton's method for approximating a solution of a nonlinear operator equation in a Banach space setting using nondiscrete mathematical induction concept introduced by Potra and Pták. We obtain new sufficient convergence conditions for Newton's method using Lipschitz and center-Lipschitz conditions instead of only the Lipschitz condition used in F. A. Potra, V. Pták, Sharp error bounds for Newton's process, Numer. Math., 34 (1980), 63–72, and F. A. Potra,...
k-Step Iterative Methods for Solving Nonlinear Systems of Equations.
W. Niethammer, M.H. Gutknecht (1986)
Numerische Mathematik
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Parallel Nonlinear Multisplitting Methods.
Andreas Frommer (1989/90)
Numerische Mathematik
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Nonlinear elliptic problems with the method of finite volumes.
Khattri, Sanjay Kumar (2006)
Differential Equations & Nonlinear Mechanics
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Convergence of Newton-Like-Iterative Methods.
T.J. Ypma (1984)
Numerische Mathematik
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An iterative procedure for solving the Riccati equation A₂R - RA₁ = A₃ + RA₄R
M. Thamban Nair (2001)
Studia Mathematica
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Let X₁ and X₂ be complex Banach spaces, and let A₁ ∈ BL(X₁), A₂ ∈ BL(X₂), A₃ ∈ BL(X₁,X₂) and A₄ ∈ BL(X₂,X₁). We propose an iterative procedure which is a modified form of Newton's iterations for obtaining approximations for the solution R ∈ BL(X₁,X₂) of the Riccati equation A₂R - RA₁ = A₃ + RA₄R, and show that the convergence of the method is quadratic. The advantage of the present procedure is that the conditions imposed on the operators A₁, A₂, A₃, A₄ are weaker than the corresponding...
A multiplicative Schwarz method and its application to nonlinear acoustic-structure interaction
Roland Ernst, Bernd Flemisch, Barbara Wohlmuth (2009)
ESAIM: Mathematical Modelling and Numerical Analysis
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A new Schwarz method for nonlinear systems is presented, constituting the multiplicative variant of a straightforward additive scheme. Local convergence can be guaranteed under suitable assumptions. The scheme is applied to nonlinear acoustic-structure interaction problems. Numerical examples validate the theoretical results. Further improvements are discussed by means of introducing overlapping subdomains and employing an inexact strategy for the local solvers.
Multiparameter extrapolation and deflation methods for solving equation systems.
Hughes Hallett, A.J. (1984)
International Journal of Mathematics and Mathematical Sciences
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