___

• [1] Marchenko, V. A., (1986), Sturm-Liouville Operators and Applications, AMS Chelsea Publishing, Basel.
• [2] Levitan, B. M. and Gasymov, M. G., (1964), Determination of a differential equation by two spectra. Uspekhi Mathematicheskikh Nauk, 19, 2, 3-63.
• [3] Jaulent, M . and Jean, C., (1976), The Inverse Problem for the one-dimensional Schr¨odinger equation with an energy-dependent potential. Annales de L’Institut Henri Poincare A, 25, 2, 105-137.
• [4] Yurko, V. A., (2000), Introduction to the Theory of Inverse Spectral Problems, Fizmatlit, MOscow, Russia, 2007, English translation, Inverse Spectral Problems dor Differantial Operators and Their Applications, Gordon and Breach, Amsterdam, The Netherlands.
• [5] Levitan, B. M., (1978), Inverse Sturm-Liouville Problems, Nauka, Moscow, Russia.
• [6] Gasymov M. G. and Guseinov, G. S., (1981), Determination of a diffusion operator from spectral data, Akademiya Nauk Azerbaidzhanskoi SSR. Doklady, 37, 2, 19-23.
• [7] Yurko, V. A., (2000), An inverse problem for differential operator pencils, Methematicheskikh Sbornik, 191, 10, 137-160.
• [8] Nabiev, M. I., (2004), The inverse spectral problem for he diffusion operator on an interval. Mathematicheskaya Fizika, Analiz, Geometriya, 11, 3, 302-313
• [9] Guseinov, G. S., (1986), Inverse spectral problems for a quadratic pencil of Sturm-Liouville operators on a finite interval. Spectral Theory of Operators and Its Applications, 51-101, Elm, Baku, Azerbaijan.
• [10] Freiling G. and Yurko V., (2001), Inverse Sturm-Liouville problems and their applications, Nova Science, Huntington, NY, USA.
• [11] Yurko, V. A., (2000), Inverse spectral problems for differential operators and their applications, vol. 2 of Analytical Methods and Special Functions, Gordon and Breach, Amsterdam, The Netherlands.
• [12] Hald, O. H., (1984), Discontinuous inverse eigenvalue problems, Communications on Pure and Applied Mathematics, 37, 5, 539–577.
• [13] Amirov, R. Kh., (2006), On Sturm-Liouville operators with discontinuity conditions inside an interval.Journal of Mathematical Analysis and Applications, 317, 1, 163-176.
• [14] AmirovR. Kh. and Yurko, V. A., (2001), On differential operators with a singularity and discontinuity conditions inside an interval.Ukrainian Mathematical Journal, 53,11,1443–1457.
• [15] FreilingG.and Yurko, V., (2002), Inverse spectral problems for singular non-selfadjoint differential operators with discontinuities in an interior point. Inverse Problems, 18, 3, 757-773.
• [16] Levin, B. Ya., (1971), Entire Functions, MGV, Moscow, Russia.
• [17] Jdanovich, B. F. (1960), Formulae for the zeros of Drichlet polynomials and quasi-polynomials. Doklady Akademii Nauk SSSR, 135, 8, 1046-1049.
• [18] Kreyn M. and Levin, B. Ya., (1949), On entire almost periodic functions of exponential type, Doklady Akademii Nauk SSSR, 64, 285-287.
• [19] Buterin S. A., Yurko V.A., (2006), Inverse spectral problem for pencils of differential operators on a finite interval. Vesn. Bashkir. Univ, 4, 8-12.
• [20] Koyunbakan H., Panakhov E. S., (2007), Half-inverse problem for diffusion operators on the finite interval.Journal of Mathematical Analysis and Applications, 326, 1024-1030.
• [21] Yang C. F.,(2010), Reconstruction of the diffusion operator from nodal data Zeitschrift fur Naturforschung, 65, 100-106.
• [22] Amirov R. Kh., Ergun A., (2015), ˙Iki noktada s¨ureksizlik kosullarına sahip difuzyon denkleminin cozumleri icin integral gosterilim, Cumhuriyet Universty Science Journal, doi:10.17776/csj.06773.