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Solution of nonlinear ordinary differential equations with quadratic and cubic terms by Morgan-Voyce matrix-collocation method

Mehmet Tarakçı, Mustafa Özel, Mehmet Sezer

2020TURKISH JOURNAL OF MATHEMATICS15 citationsDOIOpen Access PDF

Abstract

Nonlinear differential equations have many applications in different science and engineering disciplines. However, a nonlinear differential equation cannot be solved analytically and so must be solved numerically. Thus, we aim to develop a novel numerical algorithm based on Morgan-Voyce polynomials with collocation points and operational matrix method to solve nonlinear differential equations. In the our proposed method, the nonlinear differential equations including quadratic and cubic terms having the initial conditions are converted to a matrix equation. In order to obtain the matrix equations and solutions for the selected problems, code was developed in MATLAB. The solution of this method for the convergence and efficiency was compared with the equations such as Van der Pol differential equation calculated by different methods.

Topics & Concepts

MathematicsCollocation methodOrthogonal collocationNonlinear systemDifferential equationDifferential algebraic equationMatrix (chemical analysis)Mathematical analysisCollocation (remote sensing)Ordinary differential equationNumerical partial differential equationsApplied mathematicsComputer sciencePhysicsMachine learningMaterials scienceQuantum mechanicsComposite materialFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsNonlinear Waves and Solitons
Solution of nonlinear ordinary differential equations with quadratic and cubic terms by Morgan-Voyce matrix-collocation method | Litcius