عنوان المقالة: On solving an n × n system of nonlinear Volterra integral equations by the Newton-Kantorovich method
د.حميد حسام حميد | Hameed Husam Hameed | 5717
نوع النشر
مجلة علمية
المؤلفون بالعربي
حميد حسام حميد
المؤلفون بالإنجليزي
Hameed Husam Hameed, Zainidin EshkuvatovNik, Nik Mohd Asri Bin Nik Long
الملخص الانجليزي
We consider an n x n system of nonlinear integral equations of Volterra type (nonlinear VIEs) arising from an economic model. By applying the Newton-Kantorovich method to the nonlinear VIEs we linearize them into linear Volterra type integral equations (linear VIEs). Uniqueness of the solution of the system is shown. An idea has been proposed to find the approximate solution by transforming the system of linear VIEs into a system of linear Fredholm integral equations by using sub-collocation points. Then the backward Newton interpolation formula is used to find the approximate solution at the collocation points. Each iteration is solved by the Nystrom type Gauss-Legendre quadrature formula (QF). It is found that by increasing the number of collocation points of QFwith fewer iterations, a high accurate approximate solution can be obtained. Finally, an illustrative example is demonstrated to validate the accuracy of the method
تاريخ النشر
20/07/2016
الناشر
ScienceAsia
رقم المجلد
42
رقم العدد
2016
ISSN/ISBN
1513-1874
رابط DOI
10.2306/scienceasia1513-1874.2016.42S.011
الصفحات
11-18
رابط الملف
تحميل (0 مرات التحميل)
رابط خارجي
http://www.scienceasia.org/content/viewabstract.php?ms=8589
الكلمات المفتاحية
nonlinear integral operator, Volterra integral type, Gauss-Legendre method
رجوع