01 دی 1403
حسين حسين زاده

حسین حسین زاده

مرتبه علمی: استادیار
نشانی: دانشکده مهندسی سیستم های هوشمند و علوم داده - گروه ریاضی
تحصیلات: دکترای تخصصی / ریاضی
تلفن: 09171743770
دانشکده: دانشکده مهندسی سیستم های هوشمند و علوم داده

مشخصات پژوهش

عنوان The stability study of numerical solution of Fredholm integral equations of the first kind with emphasis on its application in boundary elements method
نوع پژوهش مقالات در نشریات
کلیدواژه‌ها
Radial basis functions Partial differential equations Boundary elements method Fredholm integral equations Weak and strong forms Numerical Stability Analysis of deep level transient spectroscopy data Analysis of nuclear magnetic resonance data Analysis of static light scattering data
مجله APPLIED NUMERICAL MATHEMATICS
شناسه DOI 10.1016/j.apnum.2020.07.011
پژوهشگران حسین حسین زاده (نفر اول) ، مهدی دهقان (نفر دوم) ، زینب صداقت جو (نفر سوم)

چکیده

In this paper stability of numerical solution of Fredholm integral equation of the first kind is studied for radial basis kernels which possess positive Fourier transform. As a result, the equivalence relation between strong and weak forms of partial differential equations (PDEs) is proved for some special radial test functions. Also the stability of boundary elements method (BEM) is proved analytically for Laplace and Helmholtz equations by obtaining Fourier transform of singular fundamental solutions applied in BEM. Analytical result presented in this paper is an extension of stability idea of radial basis functions (RBFs) used to interpolate scattered data described by Wendland in [51]. Similar to the interpolation, it is proved here mathematically that integral operators which have radial kernels with positive Fourier transform are strictly positive definite. Thanks to the stability idea presented in [51], a positive lower bound for eigenvalues of these integral operators is found here, explicitly.