A Nonstationary Halley’s Iteration Method by Using Divided Differences Formula

Abstract

This paper presents a new nonstationary iterative method for solving non linear algebraic equations that does not require the use of any derivative. The study uses only the Newton’s divided differences of first and second orders instead of the derivatives of (1).

Share and Cite:

Ide, N. (2012) A Nonstationary Halley’s Iteration Method by Using Divided Differences Formula. Applied Mathematics, 3, 169-171. doi: 10.4236/am.2012.32026.

1. Introduction

In order to solve the nonlinear algebraic equations of the form.

(1)

where f(x) is a known function. Let α be a simple real root of the Equation (1) and let x0 an initial approximation to α. An iterative method [1] for solving the Equation (1), in form of sequence of approximations by using the formula:

(2)

The most popular iterative process, is the Newton’s one-point process

(3)

We know that Newton’s method is quadratically convergent, this method requires two operations at each iteration, evaluation of f(xn) and. Tamara Kogan, Luba Sapir and Amir Sapir [1] illustrate that the secant method is classical 2-point iterative process which does not require use of any derivative, and they defined this method as follows

(4)

where are two successive approximations to a and is the first-order divided difference. The construction of many iterative processes is based on Newton’s divided difference formula, where

(5)

Is a divided difference of order K. Kogan [2] extended the secant method as follows:

(6)

where, , are three successive approximations to the simple root α of (1), Many iterative processes of third-order have been studied, Tamara Kogan, Luba Sapir and Amir Sapir in [1] suggest the following iterative method for approximation of a simple root α of (1):

(7)

As a nonstationary iterative process, (i.e. the function F depends on the number of iteration):

In our study, we suggest a new iterative method for approximation of a simple root α of (1) by using only the Newton’s divided differences of first and second orders instead of the derivatives of the first and second order.

2. The Principle of the Nonstationary Halley’s Iteration Method by Using Divided Differences Formula

We suggest the following iterative method for approximation of a simple root α of (1):

(8)

It is clear that (8) is a nonstationary iterative process,

The iterative method (8) is the Hally’s formula, see [3], but we take instead of and, successively, the divided differences and (of first and second orders only), hence we have two types of  errors:

1) Cubic error comes from the Hally’s iterative processes (of third-order).

2) Error comes from the approximation of divided differences.

The following example (given by [1] also), illustrates the suggested method

3. The Convergence of the Method

Let be the error at the iteration, then. Let the function :

(9)

Then,

(10)

and

(11)

Expending F(x) about and using (9) and (10) we obtain

(12)

(13)

where,

(14)

For, and using (13) we obtain,

(15)

This yields that and this proves the required.

4. Example 1

Consider the equation given in [1]:

which has as a simple root, the following Table 1 illustrates the computation by formula (8) started by x0 = 3 and x1 = 2. The correct value of the root α to 9 decimal places is 2.236067978.

Table 2 illustrates the computation by formula (6), given in [1] started by the same values x0 = 3 and x1 = 2.

5. Discussion

Example 1 shows a comparison of convergence for the

Table 1. Suggested iteration for solving.

Table 2. The iteration by formula (6), given in [1] for solving.

suggested iteration method and the iteration given by Tamara Kogan, Luba Sapir and Amir Sapir [1], the result reveals that the correct value of the root α to 9 decimal places 2.236067978 takes one step more, in addition our suggested method used only the divided differences of first and second order.

Conflicts of Interest

The authors declare no conflicts of interest.

References

[1] T. Kogan, L. Sapir and A. Sapir, “A Nonstationary Iterative Second-Order Method for Solving Non- Linear Equations,” Applied Mathematics and Computation, Vol. 188, No. 1, 2007, pp. 75-82. doi:10.1016/j.amc.2006.09.092
[2] T. I. Kogan, “Generalization of the Method of Chords for an Algebraic or Transcendental Equation,” in Russian, Ta?hkent. Gos. Univ. Naun. Trudy Vyp, Vol. 276, 1966, pp. 53-55.
[3] D. K. R. Babajee and M. Z. Dauhoo, “An Analysis of the Properties of the Variants of Newton’s Method with Third Order Convergence,” Applied Mathematics and Computation, Vol. 183, No. 1, 2006, pp. 659-684. doi:10.1016/j.amc.2006.05.116

Copyright © 2024 by authors and Scientific Research Publishing Inc.

Creative Commons License

This work and the related PDF file are licensed under a Creative Commons Attribution 4.0 International License.