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.