Multi-step derivative-free preconditioned Newton method for solving systems of nonlinear equations
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Publication:1742856
DOI10.1007/s40324-017-0112-6zbMath1444.65020OpenAlexW2588504499MaRDI QIDQ1742856
Publication date: 12 April 2018
Published in: S\(\vec{\text{e}}\)MA Journal (Search for Journal in Brave)
Full work available at URL: http://hdl.handle.net/2117/101565
Numerical computation of solutions to systems of equations (65H10) Global methods, including homotopy approaches to the numerical solution of nonlinear equations (65H20)
Cites Work
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- A parameterized multi-step Newton method for solving systems of nonlinear equations
- A technique to choose the most efficient method between secant method and some variants
- On the approximation of derivatives using divided difference operators preserving the local convergence order of iterative methods
- A novel derivative free algorithm with seventh order convergence for solving systems of nonlinear equations
- Frozen divided difference scheme for solving systems of nonlinear equations
- Numerical solution of nonlinear systems by a general class of iterative methods with application to nonlinear PDEs
- Numerical methods for roots of polynomials. Part I
- An efficient multi-step iterative method for computing the numerical solution of systems of nonlinear equations associated with ODEs
- Higher order multi-step Jarratt-like method for solving systems of nonlinear equations: application to PDEs and ODEs
- Variational iteration technique for solving a system of nonlinear equations
- Note on the improvement of Newton's method for system of nonlinear equations
- Maximum efficiency for a family of Newton-like methods with frozen derivatives and some applications
- Modified Newton's method for systems of nonlinear equations with singular Jacobian
- An efficient derivative free iterative method for solving systems of nonlinear equations
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