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Vestnik Yuzhno-Ural'skogo Universiteta. Seriya Matematicheskoe Modelirovanie i Programmirovanie, 2013, Volume 6, Issue 3, Pages 125–129
(Mi vyuru13)
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This article is cited in 2 scientific papers (total in 2 papers)
Short Notes
Mathematical Modelling of Finding the Values of Eigenfunctions for the Electrical Oscillations in the Extended Line Problem Using the Method of Regularized Traces
S. N. Kakushkin Magnitogorsk State University, Magnitogorsk, Russian Federation
Abstract:
This paper describes a new numerical method for computing the values of the eigenfunctions of perturbed self-adjoint operators. The new method is based on the method of regularized traces. A mathematical model for calculating the eigenfunction values of the spectral problem concerning electrical oscillations in the extended line is developed. The elaborated algorithms make it possible to calculate the values of the eigenfunction of the perturbed operator whether the previous values are known or not. We've obtained the estimates of functional series residual sum «suspended» the corrections of the perturbation theory of perturbed self-adjoint operators, and proved their convergence. Effective algorithms for finding «suspended» perturbation theory corrections are discovered for the numerical implementation of the method. The numerical experiments on the calculation of the values of a problem on its own electrical oscillations in the extended lines show that the method is consistent with the other well-known methods of A. N. Krylov and A. M. Danilevsky. The method of regularized traces proved its reliability and high efficiency.
Keywords:
Sturm–Liouville problem, eigenvalues, eigenfunctions, perturbation theory, the method of regularized traces.
Received: 09.06.2013
Citation:
S. N. Kakushkin, “Mathematical Modelling of Finding the Values of Eigenfunctions for the Electrical Oscillations in the Extended Line Problem Using the Method of Regularized Traces”, Vestnik YuUrGU. Ser. Mat. Model. Progr., 6:3 (2013), 125–129
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https://www.mathnet.ru/eng/vyuru13 https://www.mathnet.ru/eng/vyuru/v6/i3/p125
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