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Iteration Methods with an Auxiliary Function for Nonlinear Equations

Faisal Ali, Waqas Aslam, Imran Khalid, Akbar Nadeem

2020Journal of Mathematics14 citationsDOIOpen Access PDF

Abstract

Various iterative methods have been introduced by involving Taylor’s series on the auxiliary function <a:math xmlns:a="http://www.w3.org/1998/Math/MathML" id="M1"> <a:mi>g</a:mi> <a:mfenced open="(" close=")" separators="|"> <a:mrow> <a:mi>x</a:mi> </a:mrow> </a:mfenced> </a:math> to solve the nonlinear equation <f:math xmlns:f="http://www.w3.org/1998/Math/MathML" id="M2"> <f:mi>f</f:mi> <f:mfenced open="(" close=")" separators="|"> <f:mrow> <f:mi>x</f:mi> </f:mrow> </f:mfenced> <f:mo>=</f:mo> <f:mn>0</f:mn> </f:math> . In this paper, we introduce the expansion of <k:math xmlns:k="http://www.w3.org/1998/Math/MathML" id="M3"> <k:mi>g</k:mi> <k:mfenced open="(" close=")" separators="|"> <k:mrow> <k:mi>x</k:mi> </k:mrow> </k:mfenced> </k:math> with the inclusion of weights <p:math xmlns:p="http://www.w3.org/1998/Math/MathML" id="M4"> <p:msub> <p:mrow> <p:mi>w</p:mi> </p:mrow> <p:mrow> <p:mi>i</p:mi> </p:mrow> </p:msub> </p:math> such that <r:math xmlns:r="http://www.w3.org/1998/Math/MathML" id="M5"> <r:mstyle displaystyle="true"> <r:msubsup> <r:mrow> <r:mo stretchy="false">∑</r:mo> </r:mrow> <r:mrow> <r:mi>i</r:mi> <r:mo>=</r:mo> <r:mn>1</r:mn> </r:mrow> <r:mi>p</r:mi> </r:msubsup> <r:mrow> <r:msub> <r:mrow> <r:mi>w</r:mi> </r:mrow> <r:mrow> <r:mi>i</r:mi> </r:mrow> </r:msub> </r:mrow> </r:mstyle> <r:mo>=</r:mo> <r:mn>1</r:mn> </r:math> and knots <v:math xmlns:v="http://www.w3.org/1998/Math/MathML" id="M6"> <v:msub> <v:mrow> <v:mi>τ</v:mi> </v:mrow> <v:mrow> <v:mi>i</v:mi> </v:mrow> </v:msub> <v:mo>∈</v:mo> <v:mfenced open="[" close="]" separators="|"> <v:mrow> <v:mn>0,1</v:mn> </v:mrow> </v:mfenced> </v:math> in order to develop a new family of iterative methods. The methods proposed in the present paper are applicable for different choices of auxiliary function <ab:math xmlns:ab="http://www.w3.org/1998/Math/MathML" id="M7"> <ab:mi>g</ab:mi> <ab:mfenced open="(" close=")" separators="|"> <ab:mrow> <ab:mi>x</ab:mi> </ab:mrow> </ab:mfenced> </ab:math> , and some already known methods can be viewed as the special cases of these methods. We consider the diverse scientific/engineering models to demonstrate the efficiency of the proposed methods.

Topics & Concepts

MathematicsFunction (biology)AlgorithmApplied mathematicsAlgebra over a fieldPure mathematicsBiologyEvolutionary biologyIterative Methods for Nonlinear EquationsFractional Differential Equations SolutionsMatrix Theory and Algorithms