In this paper we analyze and compare two classical methods to solve Volterra-Fredholm integral equations. The first is a collocation method, the second one is a fixed point method. Both of them are proposed on a particular class of approximating functions. Precisely the first method is based on a linear spline class approximation and the second one on Schauder linear basis. We analyze some problems of convergence and we propose some remarks about the peculiarities and adaptability of both methods. Numerical results complete the work.
Direct and iterative methods for the numerical solution of mixed integral equations.
CALIO', FRANCA;MARCHETTI, ELENA MARIA
2010-01-01
Abstract
In this paper we analyze and compare two classical methods to solve Volterra-Fredholm integral equations. The first is a collocation method, the second one is a fixed point method. Both of them are proposed on a particular class of approximating functions. Precisely the first method is based on a linear spline class approximation and the second one on Schauder linear basis. We analyze some problems of convergence and we propose some remarks about the peculiarities and adaptability of both methods. Numerical results complete the work.File in questo prodotto:
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