Improved Bessel collocation method for linear Volterra integro-differential equations with piecewise intervals and application of a Volterra population model
DOI10.1016/j.apm.2015.12.029zbMath1465.65110OpenAlexW2208550224MaRDI QIDQ2290880
Publication date: 29 January 2020
Published in: Applied Mathematical Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.apm.2015.12.029
Bessel functions of first kindpopulation modelcollocation pointsresidual correctionimproved Bessel collocation methodVolterra integro-differential equations with piecewise intervals
Integro-partial differential equations (45K05) Population dynamics (general) (92D25) Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70)
Related Items (7)
Cites Work
- Unnamed Item
- Numerical solutions of integro-differential equations and application of a population model with an improved Legendre method
- Improved homotopy perturbation method for solving Fredholm type integro-differential equations
- Approximate solutions of linear Volterra integral equation systems with variable coefficients
- Bessel polynomial solutions of high-order linear Volterra integro-differential equations
- An efficient algorithm for solving multi-pantograph equation systems
- Solving linear integro-differential equation system by Galerkin methods with hybrid functions
- Approximate calculation of eigenvalues with the method of weighted residuals-collocation method
- Numerical solution of linear integro-differential equation by using sine-cosine wavelets
- Rationalized Haar functions method for solving Fredholm and Volterra integral equations
- Comparison between the homotopy perturbation method and the sine-cosine wavelet method for solving linear integro-differential equations
- Modified homotopy perturbation method for solving system of linear Fredholm integral equations
- An expansion-iterative method for numerically solving Volterra integral equation of the first kind
- Numerical solution of integro-differential equations by using CAS wavelet operational matrix of integration
- The variational iteration method: A highly promising method for solving the system of integro-differential equations
- Collocation and residual correction
- Solution of a system of Volterra integral equations of the first kind by Adomian method
- Numerical solution of a class of integro-differential equations by the tau method with an error estimation
- A method for the numerical solution of the integro-differential equations
- Collocation method and residual correction using Chebyshev series
- Numerical solution of the general form linear Fredholm-Volterra integro-differential equations by the tau method with an error estimation
- Chebyshev polynomial solutions of systems of higher-order linear Fredholm-Volterra integro-differential equations.
- Numerical solution of the system of Fredholm integro-differential equations by the tau method
- Legendre wavelets method for the nonlinear Volterra---Fredholm integral equations
- Numerical solution of an integral equations system of the first kind by using an operational matrix with block pulse functions
- Numerical solution of integro‐differential equations by using rationalized Haar functions method
- The approximate solution of high-order linear Volterra-Fredholm integro-differential equations in terms of Taylor polynomials
- Compact finite difference method for integro-differential equations
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