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Fast and Accurate Numerical Algorithm with Performance Assessment for Nonlinear Functional Volterra Equations

Chinedu Nwaigwe, Sanda Micula

2023Fractal and Fractional12 citationsDOIOpen Access PDF

Abstract

An efficient numerical algorithm is developed for solving nonlinear functional Volterra integral equations. The core idea is to define an appropriate operator, then combine the Krasnoselskij iterative scheme with collocation at discrete points and the Newton–Cotes quadrature rule. This results in an explicit scheme that does not require solving a nonlinear or linear algebraic system. For the convergence analysis, the discretization error is estimated and proved to converge via a recurrence relation. The discretization error is combined with the Krasnoselskij iteration error to estimate the total approximation error, hence establishing the convergence of the method. Then, numerical experiments are provided, first, to demonstrate the second order convergence of the proposed method, and secondly, to show the better performance of the scheme over the existing nonlinear-based approach.

Topics & Concepts

DiscretizationNonlinear systemMathematicsConvergence (economics)Collocation (remote sensing)Gaussian quadratureAlgebraic equationQuadrature (astronomy)Applied mathematicsNumerical analysisOperator (biology)AlgorithmMathematical optimizationComputer scienceIntegral equationNyström methodMathematical analysisPhysicsChemistryElectrical engineeringTranscription factorEngineeringEconomic growthBiochemistryQuantum mechanicsEconomicsGeneMachine learningRepressorIterative Methods for Nonlinear EquationsFractional Differential Equations SolutionsAdvanced Optimization Algorithms Research