In this paper, we construct a characteristic determinant of the spectral problem of a first-order differential equation on an interval with an integral perturbation in the boundary value condition, which is an entire analytic function of the spectral parameter. Based on the formula for the characteristic determinant, conclusions are drawn about the asymptotic behavior of the spectrum of the perturbed spectral problem depending on the modulus of continuity of the subinteral function.
E.C. Titchmarsh, The zeros of certain integral function, Proceedings of the London Mathematical
Society. s2-25 (1926) 283 - 302.
M.L. Cartwright, The zeros of certain integral function, The Quarterly Journal of Mathematics. os-1
(1930) 38 - 59.
A.M. Sedletskii, On the zeros of the Fourier transform of finite measure, Mathematical Notes. 53
(1993) 77 - 84.
N.S. Imanbaev, B.E. Kanguzhin, and B.T. Kalimbetov, On zeros the characteristic determinant of the
spectral problem for a third-order differential operator on a segment with nonlocal boundary
conditions, Advances in Difference Equations. 2013 (2013) 110.
M.A. Naimark, Linear differential operators, Moscow: Fizmatlit. (2010).
A.A. Shkalikov, The basis problem of the eigenfunctions of ordinary differential operators with
integral boundary conditions, Moscow University Mathematics Bulletin. 37 (1982) 10 - 20.
R. Bellman and K. Cook, Differential-difference equations, New York - London: Academic Press.
(1963).
O.H. Hald, Discontinuous Inverse eigenvalue problems, Communications on Pure Applied
Mathematics. 37 (1984) 539 - 577.
N.S. Imanbaev, Distribution of eigenvalues of a third-order differential operator with strongly
regular nonlocal boundary conditions, AIP Conference Proceedings. 1997 (2018) 020027.
B.Ja. Levin, Distribution of zeros of entire functions, Providence, R.I.:AMS. (1964).
V.A. Lyubishkin, and Yu. Belabbasi, On regularized sums of root of an entire function of a certain
class, Sov. Math. Dokl. 1980 (1980) 613 - 616.
N.S. Imanbaev, On nonlocal perturbation of the problem on eigenvalues of differentiation operator
on a segment, Vestnik Udmurtskogo Universiteta. Math. Mekh. Komp. Nauki. 31 (2021) 186 - 193.
V.B. Sherstyukov, Asymptotic properties of entire functions with given laws of distribution of zeros,
Complex Analysis. Entire Functions and Their Applications, Itogi Nauki i Tekhniki. Ser. Sovrem. Math.
Pril. Temat.Obz. 161 (2019) 104 - 129.
G.G. Braichev, Sharp estimates of types of entire functions with zeros on rays, Mathematical Notes.
97 (2015) 510 - 520.
K.G. Malyutin, and M.V. Kabanko, The meromorphic functions of completely regular growth on the
upper half-plane, Vestnik Udmurtskogo Universiteta. Math., Mekh., Komp.Nauki. 30 (2020) 596 - 409.
R.W. Ibrahim, and I. Aldawish, Difference formula defined by a new differential symmetric
operator for a class of meromorphically multivalent functions, Advances in Difference Equations.
2021 (2021) 281.
Kh.K. Ishkin, and R.I. Marvanov, On localization conditions for spectrum of model operator for Orr-
Sommerfeld equation, Ufa Mathematical Journal. 12 (2020) 64 - 77.
A.A. Lunyov ,and M.M. Malamud, On the completeness and Riesz basis property of root subspaces
of boundary value problems for first-order systems and applications, Journal of Spectral Theory. 5
(2015) 17 - 70.
M.A. Sadybekov and N.S. Imanbaev, Characteristic determinant of a boundary value problem,
which does not have the basis property, Eurasian Mathematical Journal. 8 (2017) 40 - 46.
A.M. Sarsenbi, Criteria for the Riesz basis property of systems of eigen-and associated functions for
higner-order differential operators on an interval, Dokl. Akad. Nauk. . 77 (2008) 290 - 292.
B.V. Shabat, An introduction to complex analysis. In 2 parts. Part 1. Functions of one variable,
Moscow: URSS. (2015).
N. Imanbaev, B. Kalimbetov, Zh. Khabibullaev, To the eigenvalue problems of a special-loaded first-
order differential operator, International Journal Mathematical Analysis. 45 (2014) 2247 - 2254.
N. Imanbaev, and M. Sadybekov, Stability of basis property of a periodic problem with nonlocal
perturbation of boundary conditions, AIP Conference Proceedings. 1759 (2016) 020080.
N.S. Imanbaev and M.A. Sadybekov, Stability of basis property of a periodic problem with nonlocal
perturbation of boundary conditions. Ufa Mathematical Journal. 3 (2011) 27 - 32.
E.C. Titchmarsh, The zeros of certain integral function, Proceedings of the London Mathematical
Society. s2-25 (1926) 283 - 302.
M.L. Cartwright, The zeros of certain integral function, The Quarterly Journal of Mathematics. os-1
(1930) 38 - 59.
A.M. Sedletskii, On the zeros of the Fourier transform of finite measure, Mathematical Notes. 53
(1993) 77 - 84.
N.S. Imanbaev, B.E. Kanguzhin, and B.T. Kalimbetov, On zeros the characteristic determinant of the
spectral problem for a third-order differential operator on a segment with nonlocal boundary
conditions, Advances in Difference Equations. 2013 (2013) 110.
M.A. Naimark, Linear differential operators, Moscow: Fizmatlit. (2010).
A.A. Shkalikov, The basis problem of the eigenfunctions of ordinary differential operators with
integral boundary conditions, Moscow University Mathematics Bulletin. 37 (1982) 10 - 20.
R. Bellman and K. Cook, Differential-difference equations, New York - London: Academic Press.
(1963).
O.H. Hald, Discontinuous Inverse eigenvalue problems, Communications on Pure Applied
Mathematics. 37 (1984) 539 - 577.
N.S. Imanbaev, Distribution of eigenvalues of a third-order differential operator with strongly
regular nonlocal boundary conditions, AIP Conference Proceedings. 1997 (2018) 020027.
B.Ja. Levin, Distribution of zeros of entire functions, Providence, R.I.:AMS. (1964).
V.A. Lyubishkin, and Yu. Belabbasi, On regularized sums of root of an entire function of a certain
class, Sov. Math. Dokl. 1980 (1980) 613 - 616.
N.S. Imanbaev, On nonlocal perturbation of the problem on eigenvalues of differentiation operator
on a segment, Vestnik Udmurtskogo Universiteta. Math. Mekh. Komp. Nauki. 31 (2021) 186 - 193.
V.B. Sherstyukov, Asymptotic properties of entire functions with given laws of distribution of zeros,
Complex Analysis. Entire Functions and Their Applications, Itogi Nauki i Tekhniki. Ser. Sovrem. Math.
Pril. Temat.Obz. 161 (2019) 104 - 129.
G.G. Braichev, Sharp estimates of types of entire functions with zeros on rays, Mathematical Notes.
97 (2015) 510 - 520.
K.G. Malyutin, and M.V. Kabanko, The meromorphic functions of completely regular growth on the
upper half-plane, Vestnik Udmurtskogo Universiteta. Math., Mekh., Komp.Nauki. 30 (2020) 596 - 409.
R.W. Ibrahim, and I. Aldawish, Difference formula defined by a new differential symmetric
operator for a class of meromorphically multivalent functions, Advances in Difference Equations.
2021 (2021) 281.
Kh.K. Ishkin, and R.I. Marvanov, On localization conditions for spectrum of model operator for Orr-
Sommerfeld equation, Ufa Mathematical Journal. 12 (2020) 64 - 77.
A.A. Lunyov ,and M.M. Malamud, On the completeness and Riesz basis property of root subspaces
of boundary value problems for first-order systems and applications, Journal of Spectral Theory. 5
(2015) 17 - 70.
M.A. Sadybekov and N.S. Imanbaev, Characteristic determinant of a boundary value problem,
which does not have the basis property, Eurasian Mathematical Journal. 8 (2017) 40 - 46.
A.M. Sarsenbi, Criteria for the Riesz basis property of systems of eigen-and associated functions for
higner-order differential operators on an interval, Dokl. Akad. Nauk. . 77 (2008) 290 - 292.
B.V. Shabat, An introduction to complex analysis. In 2 parts. Part 1. Functions of one variable,
Moscow: URSS. (2015).
N. Imanbaev, B. Kalimbetov, Zh. Khabibullaev, To the eigenvalue problems of a special-loaded first-
order differential operator, International Journal Mathematical Analysis. 45 (2014) 2247 - 2254.
N. Imanbaev, and M. Sadybekov, Stability of basis property of a periodic problem with nonlocal
perturbation of boundary conditions, AIP Conference Proceedings. 1759 (2016) 020080.
N.S. Imanbaev and M.A. Sadybekov, Stability of basis property of a periodic problem with nonlocal
perturbation of boundary conditions. Ufa Mathematical Journal. 3 (2011) 27 - 32.
Imanbaev, N. (2023). Distribution of eigenvalues of a perturbed differentiation operator on the interval. Maltepe Journal of Mathematics, 5(2), 24-31. https://doi.org/10.47087/mjm.1333727
AMA
Imanbaev N. Distribution of eigenvalues of a perturbed differentiation operator on the interval. Maltepe Journal of Mathematics. November 2023;5(2):24-31. doi:10.47087/mjm.1333727
Chicago
Imanbaev, Nurlan. “Distribution of Eigenvalues of a Perturbed Differentiation Operator on the Interval”. Maltepe Journal of Mathematics 5, no. 2 (November 2023): 24-31. https://doi.org/10.47087/mjm.1333727.
EndNote
Imanbaev N (November 1, 2023) Distribution of eigenvalues of a perturbed differentiation operator on the interval. Maltepe Journal of Mathematics 5 2 24–31.
IEEE
N. Imanbaev, “Distribution of eigenvalues of a perturbed differentiation operator on the interval”, Maltepe Journal of Mathematics, vol. 5, no. 2, pp. 24–31, 2023, doi: 10.47087/mjm.1333727.
ISNAD
Imanbaev, Nurlan. “Distribution of Eigenvalues of a Perturbed Differentiation Operator on the Interval”. Maltepe Journal of Mathematics 5/2 (November 2023), 24-31. https://doi.org/10.47087/mjm.1333727.
JAMA
Imanbaev N. Distribution of eigenvalues of a perturbed differentiation operator on the interval. Maltepe Journal of Mathematics. 2023;5:24–31.
MLA
Imanbaev, Nurlan. “Distribution of Eigenvalues of a Perturbed Differentiation Operator on the Interval”. Maltepe Journal of Mathematics, vol. 5, no. 2, 2023, pp. 24-31, doi:10.47087/mjm.1333727.
Vancouver
Imanbaev N. Distribution of eigenvalues of a perturbed differentiation operator on the interval. Maltepe Journal of Mathematics. 2023;5(2):24-31.