Authors: Serifenur Cebesoy, Yelda Aygar, Elgiz Bairamov

Abstract:

In this study, we examine some spectral properties of non-selfadjoint matrix-valued difference equations consisting of a polynomial-type Jost solution. The aim of this study is to investigate the eigenvalues and spectral singularities of the difference operator L which is expressed by the above-mentioned difference equation. Firstly, thanks to the representation of polynomial type Jost solution of this equation, we obtain asymptotics and some analytical properties. Then, using the uniqueness theorems of analytic functions, we guarantee that the operator L has a finite number of eigenvalues and spectral singularities.

Keywords: Difference Equations, Jost Functions, Asymptotics, Eigenvalues, Continuous Spectrum, Spectral Singularities.

Digital Object Identifier (DOI): doi.org/10.5281/zenodo.1109509

Procedia APA BibTeX Chicago EndNote Harvard JSON MLA RIS XML ISO 690 PDF Downloads 1755

References:

[1] M. A. Naimark, Investigation of the spectrum and the expansion in eigenfunctions of a non-selfadjoit operators of second order on a semi-axis. AMS Transl. (2), 16 (1960), 103-193.
[2] V. A. Marchenko, Sturm-Liouville Operators and Applications, Birkhauser Verlag, Basel, (1986).
[3] J. T. Schwartz, Some non-self adjoint operators, Comm. Pure Appl. Math., 13 (1960), 609-639.
[4] B. Nagy, Operators with spectral singularities, J. Oper. Theory, 15 (1986), 2, 307-325.
[5] V. E. Lyance, A differential operator with spectral singularities, I, II, AMS Transl. (2), 60 (1967), 185-225, 227-283.
[6] B. S. Pavlov, The non-selfadjoint Schr¨odinger operator, Topics in Math Phys. 1, (1967), 87-110.
[7] A. M. Krall, The adjoint of a differential operator with integral boundary conditions, Proc. Amer. Math. Soc., 16 (1965), 738-742.
[8] E. Bairamov, O. Cakar and A.M. Krall, An eigenfunction expansion for a quadratic pencil of a Schr¨odinger operator with spectral singularities, J. Differential Equations 151 (1999), 268-289.
[9] E. Bairamov, O. Cakar and C. Yanık, Spectral singularities Klein-Gordon s-wave equation, Indian J. Pure Appl. Math., 32 (2001), 851-857.
[10] A. M. Krall, E. Bairamov and O. Cakar, Spectrum and spectral singularities of a quadratic pencil of a Schr¨odinger operator with a general boundary condition. J. Differential Equations. 151 (1999), 2, 252-267.
[11] E. Bairamov and A. M. Krall, Dissipative operators generated by Sturm- Liouville differential expression in the Weyl limit circle case, J. Math. Anal. Appl., 254 (2001), 178-190.
[12] E. Bairamov and O. Karaman, Spectral singularities of Klein- Gordon s-wave equations with an integral boundary condition, Acta Math. Hungar., 97 (2002), 1-2, 121-131.
[13] A. Mostafazadeh, H. Mehri-Dehnavi, Spectral singularities, biorthonotmal systems and a two-parameter family of complex point interactions, J. Phys. A. Math. Theory, 42 (2009), 125303 (27 pp).
[14] A. Mostafazadeh, Spectral singularities of a general point interaction, J. Phys. A. Math. Theory, 44 (2011), 375302 (9 pp).
[15] A. Mostafazadeh, Optical spectral singularities as threshold resonances, Physical Review A, 83, 045801 (2011).
[16] A. Mostafazadeh, Resonance phenomenon related to spectral singularities, complex barrier potential, and resonating waveguides, Physical Review A, 80, 032711 (2009).
[17] A. Mostafazadeh, Spectral singularities of complex scattering potentials and infinite reflection and transmission coefficients at real energies, Physical Review Letters, 102 , 220402 (2009).
[18] R. P. Agarwal, Difference Equation and Inequalities, Theory, Methods and Applications, Marcel Dekker, New York, 2000.
[19] R. P. Agarwal, P. J. Wong, Advanced Topics in Difference Equations, Kluwer, Dordrecht, 1997.
[20] E. Bairamov, O. C¸ akar, A. M. Krall, Non-self adjoint difference operators and Jacobi matrices with spectral singularities, Math. Nachr.229 (2001), 5-14.
[21] A. M. Krall, E. Bairamov and O. Cakar, Spectral analysis of a non-selfadjoint discrete Schr¨odinger operators with spectral singularities, Math. Nachr., 231 (2001), 89-104.
[22] M. Adıvar and E. Bairamov, Spectral properties of non-self adjoint difference operators. J. Math. Anal. Appl., 261(2), (2001), 461-478.
[23] S. Yardımcı, A note on the spectral singularities of non-self adjoint matrix-valued difference operators, J. Comput. Appl. Math. 234,(2010), 3039-3042.
[24] Y. Aygar and E. Bairamov, Jost solution and the spectral properties of the matrix-valued difference operators. Appl. Math. Comput., 218(19), (2012), 9676-9681.
[25] Lazar’ A. Lusternik and Vladimir J. Sobolev, Elements of functional analysis. Hindistan Publishing Corp., Delhi, russian edition, 1974. International Monographs on Advanced Mathematics&Physics.
[26] V.P. Serebryakov, An inverse problem of scattering theory for difference equations with matrix coefficients, Dokl. Akad. Nauk. SSSR 250, 562-565, (1980).
[27] I. M. Glazman, Direct methods of qualitative spectral analysis of singular differential operators. Translated from the Russian by the IPST staff.
[28] E. P. Dolzhenko, Boundary value uniqueness theorems for analytic functions, Math. Notes,25 , (1979), 437-442.