Solving Volterra Integral Equations of the Second Kind with Convolution ‎Kernel‎

Barikbin, M. S.; Vahidi, A. R.; ِDamercheli, T.

رقم المقالة : IJIM-2003-1423 زيارة : 135 الصفحة: 63 - 69

نوع المخطوط: ابحاث

Solving Volterra Integral Equations of the Second Kind with Convolution ‎Kernel‎

الموضوعات : مجله بین المللی ریاضیات صنعتی

M. S. Barikbin ¹ , A. R. Vahidi ² , T. ِDamercheli ³

1 - Department of Mathematics, Yadegar-e-Emam Khomeyni (RAH) Shahr-e-Rey Branch, Islamic Azad University, Tehran, Iran.
2 - Department of Mathematics, Yadegar-e-Emam Khomeyni (RAH) Shahr-e-Rey Branch, Islamic Azad University, Tehran, Iran.
3 - Department of Mathematics, Yadegar-e-Emam Khomeyni (RAH) Shahr-e-Rey Branch, Islamic Azad University, Tehran, Iran.

تاريخ الإرسال : 28 الإثنين , رجب, 1441 تاريخ التأكيد : 02 الإثنين , ربيع الأول, 1442 تاريخ الإصدار : 17 الجمعة , جمادى الأولى, 1442

الکلمات المفتاحية: Ordinary differential equation, Volterra integral equation, Error analysis, Taylor expansion, Approximate solution,

ملخص المقالة :

In this paper, we present an approximate method to solve the solution of the second kind Volterra integral equations. This method is based on a previous scheme, applied by Maleknejad ‎et al., ‎‎[K. Maleknejad ‎and Aghazadeh, Numerical solution of Volterra integral equations of the second kind with convolution kernel by using Taylor-series expansion method, ‎Appl. Math. Comput.‎ (2005)]‎ to gain the approximate solution of the second kind Volterra integral equations with convolution kernel and Maleknejad ‎et al. ‎[K. Maleknejad ‎and‎ T. Damercheli, Improving the accuracy of solutions of the linear second kind volterra integral equations system by using the Taylor expansion method, ‎Indian J. Pure Appl. Math.‎ (2014)] ‎to gain the approximate solutions of systems of second kind Volterra integral equations with the help of Taylor expansion method. The Taylor expansion method transforms the integral equation into a linear ordinary differential equation (ODE) which, in this case, requires specified boundary conditions. Boundary conditions can be determined using the integration technique instead of differentiation technique. This method is more stable than derivative method and can be implemented to obtain an approximate solution of the Volterra integral equation with smooth and weakly singular kernels. An error analysis for the method is provided. A comparison between our obtained results and the previous results is made which shows that the suggested method is accurate enough and more ‎stable.‎

المصادر:

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Solving Volterra Integral Equations of the Second Kind with Convolution ‎Kernel‎

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