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Operational matrix of two dimensional Chebyshev wavelets and its applications in solving nonlinear partial integro-differential equations

Yaser Rostami

2020Engineering Computations20 citationsDOI

Abstract

Purpose This paper aims to present a new method for the approximate solution of two-dimensional nonlinear Volterra–Fredholm partial integro-differential equations with boundary conditions using two-dimensional Chebyshev wavelets. Design/methodology/approach For this purpose, an operational matrix of product and integration of the cross-product and differentiation are introduced that essentially of Chebyshev wavelets. The use of these operational matrices simplifies considerably the structure of the computation used for a set of the algebraic system has been obtained by using the collocation points and solved. Findings Theorem for convergence analysis and some illustrative examples of using the presented method to show the validity, efficiency, high accuracy and applicability of the proposed technique. Some figures are plotted to demonstrate the error analysis of the proposed scheme. Originality/value This paper uses operational matrices of two-dimensional Chebyshev wavelets and helps to obtain high accuracy of the method.

Topics & Concepts

Chebyshev filterMathematicsChebyshev iterationWaveletAlgebraic equationApplied mathematicsChebyshev polynomialsNonlinear systemMatrix (chemical analysis)Mathematical analysisComputer sciencePhysicsQuantum mechanicsComposite materialArtificial intelligenceMaterials scienceFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsDifferential Equations and Numerical Methods
Operational matrix of two dimensional Chebyshev wavelets and its applications in solving nonlinear partial integro-differential equations | Litcius