Numerical Solutions of Some Weak Singular Nonlinear Integral Equations of The First Type Using The Spectral Collocation Method

Authors

  • Ruaa Ahmed Abdulhussein Al Hussein Department of Applied Mathematics, Numerical Analysis, Faculty of Science, Islam Azad University

DOI:

https://doi.org/10.29304/jqcsm.2024.16.31666

Keywords:

Exponential convergence speed, Integral equations, Spectral collocation methods, Nonlinear Volterra differential

Abstract

In this paper, a collocation-spectral approximation is proposed for weakly nonlinear and neutral singular Volterra integral-differential equations with rough solutions. We used some appropriate transformations to transform the equation of the equation into a new equation, so that the solution of the new equation has a better order (smoothness) and Jacobi's orthogonal polynomial theory can be easily used. Under appropriate assumptions on the nonlinear part, we were able to perform an acceptable error analysis on the soft and the weighted  soft. To obtain a numerical approximation, some numerical examples (linear and non-linear) with uneven solutions are considered and numerical results are also presented. Also, a comparison between the proposed method and some existing numerical methods is also provided.

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References

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Published

2024-09-30

How to Cite

Ahmed Abdulhussein Al Hussein, R. (2024). Numerical Solutions of Some Weak Singular Nonlinear Integral Equations of The First Type Using The Spectral Collocation Method. Journal of Al-Qadisiyah for Computer Science and Mathematics, 16(3), Math. 53–62. https://doi.org/10.29304/jqcsm.2024.16.31666

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Math Articles