Author:
Díaz de Alba Patricia,Fermo Luisa,Rodriguez Giuseppe
Abstract
AbstractThis paper is concerned with the numerical approximation of Fredholm integral equations of the second kind. A Nyström method based on the anti-Gauss quadrature formula is developed and investigated in terms of stability and convergence in appropriate weighted spaces. The Nyström interpolants corresponding to the Gauss and the anti-Gauss quadrature rules are proved to furnish upper and lower bounds for the solution of the equation, under suitable assumptions which are easily verified for a particular weight function. Hence, an error estimate is available, and the accuracy of the solution can be improved by approximating it by an averaged Nyström interpolant. The effectiveness of the proposed approach is illustrated through different numerical tests.
Funder
Università degli Studi di Cagliari
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Mathematics
Reference36 articles.
1. Alqahtani, H., Reichel, L.: Simplified anti-Gauss quadrature rules with applications in linear algebra. Numer. Algorithms 77, 577–602 (2018)
2. Atkinson, K.E.: The Numerical Solution of Integral Equations of the Second Kind, Cambridge Monographs on Applied and Computational Mathematics, vol. 552. Cambridge University Press, Cambridge (1997)
3. Calvetti, D., Reichel, L.: Symmetric Gauss–Lobatto and modified anti-Gauss rules. BIT 43, 541–554 (2003)
4. Calvetti, D., Reichel, L., Sgallari, F.: Applications of anti-Gauss quadrature rules in linear algebra. In: Gautschi, W., Golub, G.H., Opfer, G. (eds.) Applications and Computation of Orthogonal Polynomials, pp. 41–56. Birkhauser, Basel (1999)
5. Davis, P.J., Rabinowitz, P.: Methods of Numerical Integration. Computer Science and Applied Mathematics. Elsevier Inc, Academic Press, Cambridge (1984)
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