N. S. Imanbaev, M. A. Sadybekov, “Stability of basis property of a type of problems on eigenvalues with nonlocal perturbation of boundary conditions”, Ufa Math. J., 3:2 (2011), 27

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Ufa Mathematical Journal, 2011, Volume 3, Issue 2, Pages 27–32 (Mi ufa91)

This article is cited in 5 scientific papers (total in 5 papers)

Stability of basis property of a type of problems on eigenvalues with nonlocal perturbation of boundary conditions

N. S. Imanbaev^a, M. A. Sadybekov^b

^a Ahmet Yesevi International Kazakh-Turkish University, Shymkent, Kazakhstan
^b Institute of mathematics, informatics and mechanics, Almaty, Kazakhstan

English version PDF (346 kB) Citations (5) Russian version article

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Abstract: The article is devoted to a spectral problem for a multiple differentiation operator with an integral perturbation of boundary conditions of one type which are regular, but not strongly regular. The unperturbed problem has an asymptotically simple spectrum, and its system of normalized eigenfunctions creates the Riesz basis. We construct the characteristic determinant of the spectral problem with an integral perturbation of the boundary conditions. The perturbed problem can have any finite number of multiple eigenvalues. Therefore, its root subspaces consist of its eigen and (maybe) adjoint functions. It is shown that the Riesz basis property of a system of eigen and adjoint functions is stable with respect to integral perturbations of the boundary condition.

Keywords: Riesz basis, regular boundary conditions, eigenvalues, root functions, spectral problem, integral perturbation of boundary condition, characteristic determinant.

Received: 25.03.2011

Bibliographic databases:

Document Type: Article

UDC: 517.927.25

Language: English

Original paper language: Russian

Citation: N. S. Imanbaev, M. A. Sadybekov, “Stability of basis property of a type of problems on eigenvalues with nonlocal perturbation of boundary conditions”, Ufa Math. J., 3:2 (2011), 27–32

Citation in format AMSBIB

\Bibitem{ImaSad11}

\by N.~S.~Imanbaev, M.~A.~Sadybekov

\paper Stability of basis property of a~type of problems on eigenvalues with nonlocal perturbation of boundary conditions

\jour Ufa Math. J.

\yr 2011

\vol 3

\issue 2

\pages 27--32

\mathnet{http://mi.mathnet.ru/eng/ufa91}

\zmath{https://zbmath.org/?q=an:1249.34250}

Linking options:

https://www.mathnet.ru/eng/ufa91

https://www.mathnet.ru/eng/ufa/v3/i2/p28

This publication is cited in the following 5 articles:

Nurlan S. Imanbaev, “Characteristic determinant of a perturbed regular third-order differential operator on an interval”, Zhurn. SFU. Ser. Matem. i fiz., 18:1 (2025), 25–31
M. A. Sadybekov, N. S. Imanbaev, “A Regular Differential Operator with Perturbed Boundary Condition”, Math. Notes, 101:5 (2017), 878–887
M. A. Sadybekov, N. S. Imanbaev, “Characteristic determinant of a boundary value problem, which does not have the basis property”, Eurasian Math. J., 8:2 (2017), 40–46
N. S. Imanbaev, M. A. Sadybekov, “About Characteristic Determinant of One Boundary Value Problem Not Having the Basis Property”, International Conference Functional Analysis in Interdisciplinary Applications, FAIA 2017, AIP Conference Proceedings, 1880, eds. T. Kalmenov, M. Sadybekov, Amer. Inst. Physics, 2017, UNSP 050002
N. S. Imanbaev, M. A. Sadybekov, “Stability of Basis Property of a Periodic Problem With Nonlocal Perturbation of Boundary Conditions”, International Conference on Analysis and Applied Mathematics ICAAM 2016, AIP Conference Proceedings, 1759, eds. A. Ashyralyev, A. Lukashov, Amer. Inst. Physics, 2016, 020080

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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Abstract page:	719
Russian version PDF:	250
English version PDF:	44
References:	99
First page:	2

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