Müntz-Legendre polynomial solutions of linear delay Fredholm integro-differential equations and residual correction
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Date
2013
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Abstract
In this paper, we consider the Müntz-Legendre polynomial solutions of the linear delay Fredholm integro-differential equations and residual correction. Firstly, the linear delay Fredholm integro-differential equations are transformed into a system of linear algebraic equations by using by the matrix operations of the Müntz-Legendre polynomials and the collocation points. When this system is solved, the Müntz-Legendre polynomial solution is obtained. Then, an error estimation is presented by means of the residual function and the Müntz-Legendre polynomial solutions are improved by the residual correction method. The technique is illustrated by studying the problem for an example. The obtained results show that error estimation and the residual correction method is very effective.
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Electromagnetic wave attenuation , Integrodifferential equations , Linear algebra , Linear equations , Collocation method , Collocation points , Fredholm integro-differential equations , Legendre polynomials , Matrix operations , Residual correction , Residual functions , System of linear algebraic equations , Polynomials