高阶非线性方程解及其动力学行为

Sabir Yasin, Amir Naseem
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引用次数: 0

摘要

在本报告中,我们提出了求解非线性方程的新的六阶迭代方法。这些方法的推导完全基于变分迭代技术。为了验证该方法的有效性和有效性,我们通过求解一些测试实例,将其与牛顿方法、奥斯特洛夫斯基方法、特劳布方法和修正的哈雷方法进行了比较。数值结果表明,我们提出的方法更有效。最后,我们将我们开发的方法的多项式与牛顿方法、奥斯特洛夫斯基方法、特劳布方法和修正的哈雷方法进行了比较。数学学科分类:37F50。
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Higher Order Nonlinear Equation Solvers and their Dynamical Behavior
In this report we present new sixth order iterative methods for solving non-linear equations. The derivation of these methods is purely based on variational iteration technique. To check the validity and efficiency we compare of methods with Newton’s method, Ostrowski’s method, Traub’s method and modified Halleys’s method by solving some test examples. Numerical results shows that our developed methods are more effective. Finally, we compare polynomigraphs of our developed methods with Newton’s method, Ostrowski’s method, Traub’s method and modified Halleys’s method. Mathematics Subject Classification: 37F50.
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自引率
0.00%
发文量
10
审稿时长
8 weeks
期刊最新文献
Multiplicity results for a class of nonlinear singular differential equation with a parameter Floquet Exponent of Solution to Homogeneous Growth-Fragmentation Equation Some new results of ostrowski type inequalities using 4-step quadratic kernel and their applications An Introduction to the Construction of Subfusion Frames Upper Estimates For Initial Coefficients and Fekete-Szegö Functional of A Class of Bi-univalent Functions Defined by Means of Subordination and Associated with Horadam Polynomials
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