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New Numerical Methods for Solving the Initial Value Problem Based on a Symmetrical Quadrature Integration Formula Using Hybrid Functions

Zainab J. Kadum, Noori Yasir Abdul-Hassan

2023Symmetry10 citationsDOIOpen Access PDF

Abstract

In this study, we construct new numerical methods for solving the initial value problem (IVP) in ordinary differential equations based on a symmetrical quadrature integration formula using hybrid functions. The proposed methods are designed to provide an efficient and accurate solution to IVP and are more suitable for problems with non-smooth solutions. The key idea behind the proposed methods is to combine the advantages of traditional numerical methods, such as Runge–Kutta and Taylor’s series methods, with the strengths of modern hybrid functions. Furthermore, we discuss the accuracy and stability analysis of these methods. The resulting methods can handle a wide range of problems, including those with singularities, discontinuities, and other non-smooth features. Finally, to demonstrate the validity of the proposed methods, we provide several numerical examples to illustrate the efficiency and accuracy of these methods.

Topics & Concepts

Numerical integrationClassification of discontinuitiesQuadrature (astronomy)Numerical analysisApplied mathematicsNyström methodGravitational singularityNumerical stabilityTanh-sinh quadratureGauss–Kronrod quadrature formulaComputer scienceRunge–Kutta methodsMathematicsInitial value problemOrdinary differential equationGaussian quadratureMathematical optimizationDifferential equationMathematical analysisIntegral equationElectrical engineeringEngineeringNumerical methods for differential equationsDifferential Equations and Numerical MethodsFractional Differential Equations Solutions