Your search keyword '"Kumar, Deepak"' showing total 3 results

1. Optimal One-Point Iterative Function Free from Derivatives for Multiple Roots.

Author

Kumar, Deepak, Sharma, Janak Raj, and Argyros, Ioannis K.

Subjects

*NEWTON-Raphson method, *FAMILY-work relationship

Abstract

We suggest a derivative-free optimal method of second order which is a new version of a modification of Newton's method for achieving the multiple zeros of nonlinear single variable functions. Iterative methods without derivatives for multiple zeros are not easy to obtain, and hence such methods are rare in literature. Inspired by this fact, we worked on a family of optimal second order derivative-free methods for multiple zeros that require only two function evaluations per iteration. The stability of the methods was validated through complex geometry by drawing basins of attraction. Moreover, applicability of the methods is demonstrated herein on different functions. The study of numerical results shows that the new derivative-free methods are good alternatives to the existing optimal second-order techniques that require derivative calculations. [ABSTRACT FROM AUTHOR]

Published

2020

2. One-Point Optimal Family of Multiple Root Solvers of Second-Order.

Author

Kumar, Deepak, Sharma, Janak Raj, and Cesarano, Clemente

Subjects

*NEWTON-Raphson method, *NONLINEAR equations, *FAMILIES

Abstract

This manuscript contains the development of a one-point family of iterative functions. The family has optimal convergence of a second-order according to the Kung-Traub conjecture. This family is used to approximate the multiple zeros of nonlinear equations, and is based on the procedure of weight functions. The convergence behavior is discussed by showing some essential conditions of the weight function. The well-known modified Newton method is a member of the proposed family for particular choices of the weight function. The dynamical nature of different members is presented by using a technique called the "basin of attraction". Several practical problems are given to compare different methods of the presented family. [ABSTRACT FROM AUTHOR]

Published

2019

3. On a Bi-Parametric Family of Fourth Order Composite Newton–Jarratt Methods for Nonlinear Systems.

Author

Sharma, Janak Raj, Kumar, Deepak, Argyros, Ioannis K., and Magreñán, Ángel Alberto

Subjects

*NONLINEAR equations, *BOUNDARY value problems, *NONLINEAR systems, *NEWTON-Raphson method, *FAMILIES

Abstract

We present a new two-parameter family of fourth-order iterative methods for solving systems of nonlinear equations. The scheme is composed of two Newton–Jarratt steps and requires the evaluation of one function and two first derivatives in each iteration. Convergence including the order of convergence, the radius of convergence, and error bounds is presented. Theoretical results are verified through numerical experimentation. Stability of the proposed class is analyzed and presented by means of using new dynamics tool, namely, the convergence plane. Performance is exhibited by implementing the methods on nonlinear systems of equations, including those resulting from the discretization of the boundary value problem. In addition, numerical comparisons are made with the existing techniques of the same order. Results show the better performance of the proposed techniques than the existing ones. [ABSTRACT FROM AUTHOR]

Published

2019