-
[11] Y. Koçak, M.A. Dokuyucu, E. Çelik, Well-Posedness of Optimal Control Problem for the Schrödinger Equations with Complex Potential, International Journal of Mathematics and Computation, 2015, 26 (4), 11-16
-
[12] G.Ya. Yagubov, N.S. Ibrahimov, Optimal control problem for nonstationary quasi optic equation, Problems of mathematical modeling and optimal control, Baku, 2001, pp. 49-57 (in Russian).
-
[13] H. yetişkin., M. Subaşı., On the optimal control problem for Schrödinger equation with complex potential, Applied Mathematics and Computation, 2010, 216(7), pp. 1896–1902
-
[14] G.Ya. Yagubov, M.A. Musayeva, On the identification problem for nonlinear Schrödinger equation, Differentsial’niye uravneniya 3(12) (1997) 1691–1698 (in Russian)
-
[15] M. Koksal, M.E. Koksal, Commutativity of Linear Time-varying Differential Systems with Non-zero Initial Conditions: A Review and Some New Extensions,Mathematical Problems in Engineering, 2011 (2011) Article Number: 678575, 1-25, 2
-
[16] M. Koksal, M.E. Koksal, Commutativity of Cascade Connected Discrete Time Linear Time-Varying Systems, Transactions of the Institute of Measurement and Control, 2015, 37 (5) 615-622
-
[17] M.A. Vorontsov, V. I. Shmalgauzen, Principles of adaptive optics. Moscow, Izdatel’stvo Nauka, 1985, 336 p. (in Russian)
-
[18] K. Yosida, Functional analysis. Springer, 1980
-
[19] O.A. Ladyzhanskaya, V.A. Sollonnikov, N.M. Uraltseva, Linear and Quasi- Linear Equations of Parabolic Type, Translation of Mathematical Monographs. AMS, Rhode Island, 1968
-
[20] N.S. Ibrahimov, Solubility of initial-boundary value problems for linear stationary equation of quasi optic. Journal of Qafqaz University. 2010, No:29, pp. 61-70 (in Russian)