عنوان المقالة: General 2 × 2 system of nonlinear integral equations and its approximate solution
د.حميد حسام حميد | Hameed Husam Hameed | 5712
نوع النشر
مجلة علمية
المؤلفون بالعربي
حميد حسام حميد
المؤلفون بالإنجليزي
Z.K. Eshkuvatov, Hameed Husam Hameed, B.M. Taib, N.M.A. Nik Long
الملخص الانجليزي
In this note, we consider a general 2 × 2 system of nonlinear Volterra type integralequations. The modified Newton method (modified NM) is used to reduce the nonlinear problems into 2 × 2 linear system of algebraic integral equations of Volterra type. The latter equation is solved by discretization method. Nystrom method with Gauss–Legendre quadrature is applied for the kernel integrals and Newton forwarded interpolation formula is used for finding values of unknown functions at the selected node points. Existence and uniqueness solution of the problems are proved and accuracy of the quadrature formula together with convergence of the proposed method are obtained. Finally, numerical examples are provided to show the validity and efficiency of the method presented. Numerical results reveal that the proposed methods is efficient and accurate. Comparisons with other methods for the same problem are also presented
تاريخ النشر
01/12/2019
الناشر
The Journal of Computational and Applied Mathematics
رقم المجلد
316
رقم العدد
2019
ISSN/ISBN
0377-0427
رابط DOI
https://doi.org/10.1016/j.cam.2019.04.025
الصفحات
528-546
رابط الملف
تحميل (0 مرات التحميل)
الكلمات المفتاحية
Modified Newton method,Gauss–Legendre quadrature formula,nonlinear operator,Volterra integral equation, Discretization
رجوع