Construction of a characteristic determinant for one type of eigenvalue problems under integral perturbation of two boundary conditions
DOI:
https://doi.org/10.26577/JMMCS-2019-4-m2Keywords:
Characteristic determinant, Riesz basis property, strongly regular boundary conditions, root functions, integral perturbation of boundary conditionAbstract
It is well known that the system of eigenfunctions of an operator given by a formally self-adjoint
differential expression, with arbitrary self-adjoint boundary conditions providing a discrete spectrum,
forms an orthonormal basis. In many papers, the question on saving basis properties under
some (weak in a certain sense) perturbation of the initial operator has been investigated. For the
case of an arbitrary ordinary differential operator, when unperturbed boundary conditions are
strongly regular, the question of the stability of the basis property of root vectors under their
integral perturbation is positively solved in papers of A.A. Shkalikov. In a series of our previous
papers, we have considered the question of constructing a characteristic determinant and of the
stability of the basis property of the root vectors under the integral perturbation of one of the
boundary conditions. Almost all possible types of the boundary conditions that are regular but not
strongly regular have been considered. In the present paper, a spectral problem for the multiple
differentiation operator under the integral perturbation of one type boundary conditions being
regular but not strongly regular is considered. In contrast to the previous papers we consider a
case when the integral perturbation is present in both boundary conditions. The first main result
of the paper is to construct a characteristic determinant of the spectral problem. Based on the
obtained formula, we come to the conclusion about the asymptotic behavior of eigenvalues and
eigenfunctions of the problem. The second main result of the paper is to justify the Riesz basis
property of the system of root functions of the problem under consideration under the integral
perturbation of two boundary conditions.
References
SSSR V.142, no. 3 (1962): 538–541.
[2] Kerimov N.B. and Mamedov K.R., "On the Riesz basis property of the root functions in certain regular boundary value
problems" , Mathematical Notes V. 64, no. 3-4(1998): 483–487.
[3] Makin A.S., "On a nonlocal perturbation of a periodic eigenvalue problem" , Differential Equations 42(2006): 599–602.
[4] Il’in V.A and Kritskov L.V., "Properties of spectral expansions corresponding to non-self-adjoint differential operators" ,
Journal of Mathematical Sciences (New York) V.116, no.5 (2003): 3489—3550.
[5] Shkalikov A.A., "Basis Property of Eigenfunctions of Ordinary Differential Operators with Integral Boundary Conditions" ,
Vestnik Moskov. Univ. Ser. I Mat. Mech. 6(1982): 12–21.
[6] Shkalikov A.A., "On the basis problem of the eigenfunctions of an ordinary differential operator" , RussianMath. Surveys
34 (1979): 249-–250.
[7] Imanbaev N.S. and Sadybekov M.A., "Stability of basis property of a type of problems on eigenvalues with nonlocal
perturbation of boundary conditions" , Ufimsk. Mat. Zh. 3(2011): 28–33.
[8] Sadybekov M.A. and Imanbaev N.S., "On the Basis Property of Root Functions of a Periodic Problem with an Integral
Perturbation of the Boundary Condition" , Differential Equations 48(2012): 896–900.
[9] Imanbaev N.S. and Sadybekov M.A., "On spectral properties of a periodic problem with an integral perturbation of the
boundary condition" , Eurasian Mathematical Journal 4(2013): 53–62.
[10] Imanbaev N.S., "On stability of the basis property of the system of root vectors of the Sturm-Liouville operator with
an integral perturbation of the boundary conditions in a not strengthened regular problems of Samarskii-Ionkin type" ,
Matematicheskiy zhurnal 15(2015): 96–107.
[11] Imanbaev N., "Stability of the basis property of system of root functions of Sturm-Liouville operator with integral
boundary condition" , Matematicheskiy zhurnal 16(2016): 125–136.
[12] Sadybekov M.A. and Imanbaev N.S., "On a problem not having the property of basis property of root vectors, connected
with the perturbed regular operator of multiple differentiation" , Matematicheskiy zhurnal 17(2017): 117–125.
[13] Sadybekov M.A. and Imanbaev N.S., "A Regular Differential Operator with Perturbed Boundary Condition" , Mathematical
Notes V. 101, no. 5(2017): 878–887.
[14] Sadybekov M.A. and Imanbaev N.S., "Characteristic determinant of a boundary value problem, which does not have the
basis property" , Eurasian Math. J. 8(2017): 40—46.
[15] Imanbaev N.S. and Sadybekov M.A., "Regular Sturm-Liouville Operators with Integral Perturbation of Boundary
Condition" , Functional Analysis in Interdisciplinary Applications, Springer Proceedings in Mathematics & Statistics
216(2017): 222—234.
[16] Naymark M.A., "Lineynyye differentsial’nyye operatory Moskva, 1969.
[17] Krall A.M., "The development of general differential and general differential-boundary systems" , Rocky Mountain J.
Math 5(1975): 493—542.
[18] Lang P. and Locker J., "Spectral Theory of Two-Point Differential Operators Determined by -D2" , J. Math. Anal. And
Appl 146(1990): 148–191.