V. Kanwar scite author profile

There are few optimal fourth-order methods for solving nonlinear equations when the multiplicity m of the required root is known in advance. Therefore, the principle focus of this paper is on developing a new fourth-order optimal family of iterative methods. From the computational point of view, the conjugacy maps and the strange fixed points of some iterative methods are discussed, their basins of attractions are also given to show their dynamical behavior around the multiple roots. Further, using Mathematica with its high precision compatibility, a variety of Numer Algor concrete numerical experiments and relevant results are extensively treated to confirm the theoretical development.

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Modified families of Newton, Halley and Chebyshev methods

Kanwar¹,

Tomar²

2007

Applied Mathematics and Computation

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Higher-order derivative-free families of Chebyshev–Halley type methods with or without memory for solving nonlinear equations

Argyros

Kansal

Kanwar

et al. 2017

Applied Mathematics and Computation

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On some modified families of multipoint iterative methods for multiple roots of nonlinear equations

Kumar

Kanwar

Singh

2012

Applied Mathematics and Computation

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New optimal class of higher-order methods for multiple roots, permitting f′(xn)=0

Kanwar

Bhatia

Kansal

2013

Applied Mathematics and Computation

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V. Kanwar

An optimal fourth-order family of methods for multiple roots and its dynamics

Modified families of Newton, Halley and Chebyshev methods

Higher-order derivative-free families of Chebyshev–Halley type methods with or without memory for solving nonlinear equations

On some modified families of multipoint iterative methods for multiple roots of nonlinear equations

New optimal class of higher-order methods for multiple roots, permitting f′(xn)=0

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