Semilocal convergence analysis of a fifth-order method using recurrence relations in Banach space under weak conditions
From MaRDI portal
Publication:4614228
DOI10.4064/am2318-1-2017zbMath1469.65098OpenAlexW2902587414WikidataQ128852734 ScholiaQ128852734MaRDI QIDQ4614228
Santhosh George, Ioannis K. Argyros
Publication date: 30 January 2019
Published in: Applicationes Mathematicae (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4064/am2318-1-2017
Related Items (2)
Convergence analysis of a fifth-order iterative method using recurrence relations and conditions on the first derivative ⋮ Local convergence analysis of two iterative methods
Cites Work
- Unnamed Item
- Unnamed Item
- An efficient fifth order method for solving systems of nonlinear equations
- Increasing the order of convergence for iterative methods to solve nonlinear systems
- Semilocal convergence analysis of an iteration of order five using recurrence relations in Banach spaces
- Improved local analysis for a certain class of iterative methods with cubic convergence
- On the computational efficiency index and some iterative methods for solving systems of nonlinear equations
- Variants of Newton's method for functions of several variables
- On Newton-type methods with cubic convergence
- A modified Newton method with cubic convergence: the multivariate case
- Variants of Newton's method using fifth-order quadrature formulas
- Computational theory of iterative methods.
- Ball convergence of a sixth order iterative method with one parameter for solving equations under weak conditions
- Some modifications of Newton's method with fifth-order convergence
- LOCAL CONVERGENCE FOR SOME THIRD-ORDER ITERATIVE METHODS UNDER WEAK CONDITIONS
- A modified Newton-Jarratt's composition
This page was built for publication: Semilocal convergence analysis of a fifth-order method using recurrence relations in Banach space under weak conditions
