Etude des équations intégrales de Volterra de première espèce en utilisant les techniques des splines
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Date
2021
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Université de M'sila
Abstract
as ill-posed problems.
Generally a discretization of this equations lead to ill-conditioned linear systems. Moreover a slight
perturbation in right hand side lead to enormous change of the solution.
In this thesis, we present various regularization methods to obtain a stable solution such as SVD,
Tikhonov’s regularization, and Lavrentiev method.
Also, we present a new numerical method for solving Volterra linear integral equations of first kind,
based on the technical modified Lavrentiev classical method where we find it better than
approximation method based on the Taylor expansion, and the spline cubic method.
The efficiency of our new numerical method is tested by solving some examples for which the exact
solution is known. This allows us to estimate the exactness of our numerical results.
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Keywords
First-kind integral equations of Volterra, ill-posed problem, numerical quadrature, Tikhonov’s regularization, Lavrentiev method, splines functions.