Some families of two-step simultaneous methods for determining zeros of nonlinear equations
From MaRDI portal
Publication:420266
DOI10.5402/2011/817174zbMath1242.65099OpenAlexW1988329635WikidataQ58689749 ScholiaQ58689749MaRDI QIDQ420266
Nazir Ahmad Mir, Iffat Jabeen, Rifka Muneer
Publication date: 21 May 2012
Published in: ISRN Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.5402/2011/817174
convergencenumerical resultsnonlinear equationsdistinct zeroiterative simultaneous methodorder fourorder sixtwo-step simultaneous methods
Related Items (9)
On highly efficient derivative-free family of numerical methods for solving polynomial equation simultaneously ⋮ On iterative techniques for estimating all roots of nonlinear equation and its system with application in differential equation ⋮ Efficient iterative methods for finding simultaneously all the multiple roots of polynomial equation ⋮ A general three-step class of optimal iterations for nonlinear equations ⋮ ON EFFICIENT FRACTIONAL CAPUTO-TYPE SIMULTANEOUS SCHEME FOR FINDING ALL ROOTS OF POLYNOMIAL EQUATIONS WITH BIOMEDICAL ENGINEERING APPLICATIONS ⋮ Study of dynamical behavior and stability of iterative methods for nonlinear equation with applications in engineering ⋮ Novel computational iterative methods with optimal order for nonlinear equations ⋮ Inverse numerical iterative technique for finding all roots of nonlinear equations with engineering applications ⋮ On dynamics of iterative techniques for nonlinear equation with applications in engineering
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Finding the roots of a polynomial on an MIMD multicomputer
- A high order iteration formula for the simultaneous inclusion of polynomial zeros
- Iterative methods for simultaneous inclusion of polynomial zeros
- On some methods for the simultaneous determination of polynomial zeros
- New iterative methods for nonlinear equations
This page was built for publication: Some families of two-step simultaneous methods for determining zeros of nonlinear equations
