مشخصات پژوهش

صفحه نخست /A wavelet Petrov–Galerkin ...
عنوان
A wavelet Petrov–Galerkin method for solving integro-differential equations
نوع پژوهش مقاله چاپ شده
کلیدواژه‌ها
integro-differential equation; wavelet; Petrov–Galerkin; trial space; test space
چکیده
In this paper, we solve integro-differential equation by using the Alpert multiwavelets as basis functions. We also use the orthogonality of the basis of the trial and test spaces in the Petrov–Galerkin method. The computations are reduced because of orthogonality. Thus the final system that we get from discretizing the integro-differential equation has a very small dimension and enough accuracy. We compare the results with [M. Lakestani, M. Razzaghi, and M. Dehghan, Semiorthogonal spline wavelets approximation for Fredholm integro-differential equations, Math. Probl. Eng. 2006 (2006), pp. 1–12, Article ID 96184] and [A. Ayad, Spline approximation for first-order Fredholm integro-differential equation, Stud. Univ. BabesBolyai. Math., 41(3), (1996), pp. 1–8] which used a much larger dimension system and got less accurate results. In [Z. Chen and Y. Xu, The Petrov–Galerkin and iterated Petrov–Galerkin methods for second kind integral equations, SIAM J. Numer. Anal. 35(1) (1998), pp. 406–434], convergence of Petrov–Galerkin method has been discussed with some restrictions on degrees of chosen polynomial basis, but in this paper convergence is obtained for every degree.
پژوهشگران خسرو مالک نژاد (نفر اول)، محسن ربانی (نفر دوم)، ناصر آقازاده (نفر سوم)، مجید کرمی (نفر چهارم)