Abstract:
Riesz basisness with brackets of the eigen and associated function is proved for a 2-nd order differential operator with involution in the derivatives and with integral boundary conditions. To demonstrate this the spectral problem of the initial operator is reduced to the spectral problem of a 1-st order operator without involution in the 4-dimensional vector-function space. The equation of the new spectral problem contains a difficult non-trivial coefficient of the unknown function, but after a transformation, depending on the spectral parameter λ, this coefficient can be estimated as O(λ−1/2). This makes it possible to get under some regularity conditions the location of eigenvalues of the initial operator and to present its resolvent by integral operators of simpler structure. These facts together with completeness of the eigen and associated functions of the operator, adjoint to the initial one, underlie the proof of the result formulated.
The results have been obtained in the framework of the national tasks of the Ministry of Education and Science
of the Russian Federation (project no. 1.1520.2014K).
Bibliographic databases:
Document Type:
Article
UDC:517.984
Language: Russian
Citation:
V. P. Kurdyumov, “On Riescz bases of eigenfunction of 2-nd order differential operator with involution and integral boundary conditions”, Izv. Saratov Univ. Math. Mech. Inform., 15:4 (2015), 392–405
\Bibitem{Kur15}
\by V.~P.~Kurdyumov
\paper On Riescz bases of eigenfunction of $2$-nd order differential operator with involution and integral boundary conditions
\jour Izv. Saratov Univ. Math. Mech. Inform.
\yr 2015
\vol 15
\issue 4
\pages 392--405
\mathnet{http://mi.mathnet.ru/isu607}
\crossref{https://doi.org/10.18500/1816-9791-2015-15-4-392-405}
\elib{https://elibrary.ru/item.asp?id=25360655}
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https://www.mathnet.ru/eng/isu607
https://www.mathnet.ru/eng/isu/v15/i4/p392
This publication is cited in the following 9 articles:
Ya. A. Granilshchikova, A. A. Shkalikov, “Spectral properties of a differential operator with involution”, Moscow University Mathematics Bulletin, Moscow University Mеchanics Bulletin, 77:4 (2022), 204–208
D. M. Polyakov, “Spectral Asymptotics of Two-Term Even Order Operators with Involution”, J Math Sci, 260:6 (2022), 806
Kritskov V L. Ioffe V.L., “Spectral Properties of the Cauchy Problem For a Second-Order Operator With Involution”, Differ. Equ., 57:1 (2021), 1–10
P. I. Kalenyuk, Ya. O. Baranetskij, L. I. Kolyasa, “A nonlocal problem for a differential operator of even order with involution”, J. Appl. Anal., 26:2 (2020), 297–307
Ya.O. Baranetskij, P.I. Kalenyuk, M. I. Kopach, A.V. Solomko, “The nonlocal problem with multi- point perturbations of the boundary conditions of the Sturm-type for an ordinary differential equation with involution of even order”, Mat. Stud., 54:1 (2020), 64
V. E. Vladykina, A. A. Shkalikov, “Regular Ordinary Differential Operators with Involution”, Math. Notes, 106:5 (2019), 674–687
A. Sh. Shaldanbayev, M. B. Ivanova, A. N. Urmatova, A. A. Shaldanbayeva, “Spectral decomposition of a first order functional differential operator”, News Natl. Acad. Sci. Rep. Kazakhstan-Ser. Phys.-Math., 6:328 (2019), 90–105
A. Sh. Shaldanbayev, S. M. Shalenova, M. B. Ivanova, A. A. Shaldanbayeva, “On spectral properties of a boundary value problem of the first order equation with deviating argument”, News Natl. Acad. Sci. Rep. Kazakhstan-Ser. Phys.-Math., 5:327 (2019), 19–39
L. V. Kritskov, A. M. Sarsenbi, “Riesz basis property of system of root functions of second-order differential operator with involution”, Diff Equat, 53:1 (2017), 33
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