New third-order method for solving systems of nonlinear equations
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Publication:1014367
DOI10.1007/s11075-008-9227-2zbMath1163.65027OpenAlexW1965600178MaRDI QIDQ1014367
Publication date: 27 April 2009
Published in: Numerical Algorithms (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11075-008-9227-2
Related Items (8)
Some new efficient multipoint iterative methods for solving nonlinear systems of equations ⋮ Variational iteration technique for solving a system of nonlinear equations ⋮ Efficient families of Newton's method and its variants suitable for non-convergent cases ⋮ A new Gauss–Newton-like method for nonlinear equations ⋮ On a novel fourth-order algorithm for solving systems of nonlinear equations ⋮ A family of derivative-free methods for nonlinear equations ⋮ New efficient multipoint iterative methods for solving nonlinear systems ⋮ A modified trapezoidal Broyden's method for nonlinear equations
Cites Work
- An analysis of the properties of the variants of Newton's method with third order convergence
- A third-order Newton-type method to solve systems of nonlinear equations
- A family of multi-point iterative methods for solving systems of nonlinear equations
- Modified families of Newton, Halley and Chebyshev methods
- Some variant of Newton's method with third-order convergence.
- Third-order methods from quadrature formulae for solving systems of nonlinear equations.
- A new continuation Newton-like method and its deformation
- On Newton-type methods with cubic convergence
- Accelerated iterative methods for finding solutions of a system of nonlinear equations
- Efficient continuation Newton-like method for solving systems of non-linear equations
- Iterative Solution of Nonlinear Equations in Several Variables
- An acceleration of Newton's method: Super-Halley method
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