Variational iteration method for solving uncertain differential equations

Solving uncertain differential equations is a critical subject in the field of uncertainty theory, where uncertain differential equations are a sort of differential equations that involve Liu processes. Currently, considerable effort has been put into addressing this issue. Regrettably, analytic sol...

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Bibliographic Details
Published inJournal of intelligent & fuzzy systems Vol. 44; no. 4; pp. 6453 - 6461
Main Authors Li, Wanping, Zhang, Guidong, Sheng, Yuhong
Format Journal Article
LanguageEnglish
Published London, England SAGE Publications 01.01.2023
Sage Publications Ltd
Subjects
Algorithms
Differential equations
Exact solutions
Iterative methods
Numerical methods
uncertainty theory
Uncertain differential equation
variational iteration method
analytic solution
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Summary:Solving uncertain differential equations is a critical subject in the field of uncertainty theory, where uncertain differential equations are a sort of differential equations that involve Liu processes. Currently, considerable effort has been put into addressing this issue. Regrettably, analytic solutions to uncertain differential equations are not always accessible. As a result, several numerical methods have been investigated. However, numerical methods have certain limitations in terms of providing a continuous representation of the solution as well as more information about the solution. This paper will propose a novel algorithm based on the variational iteration method (VIM) for solving uncertain differential equations analytically or approximately analytically. The associated numerical experiments show that the proposed method is an efficient tool for solving uncertain differential equations.
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ISSN:1064-1246
1875-8967
DOI:10.3233/JIFS-223593