Inverse problem for a second order impulsive system of integro-differential equations with two redefinition vectors and mixed maxima

An inverse problem for a second order system of ordinary integro-differential equations with impulsive effects, mixed maxima and two redefinition vectors is investigated. A system of nonlinear functional integral equations is obtained by applying some transformations. The existence and uniqueness of the solution of the nonlinear inverse problem is reduced to the unique solvability of the system of nonlinear functional integral equations in Banach space PC ([0,T],Rⁿ). The method of successive approximations in combination with the method of compressing mapping is used in the proof of unique solvability of the nonlinear functional integral equations. Then values of redefinition vectors are founded.

1. Benchohra M., Henderson J., Ntouyas S.K. Impulsive differential equations and inclusions. Contemporary mathematics and its application. Hindawi Publishing Corporation, New York, 2006.

2. Halanay A., Veksler D. Qualitative theory of impulsive systems. Mir, Moscow, 1971, 309 p. (in Russian).

3. Lakshmikantham V., Bainov D.D., Simeonov P.S. Theory of impulsive differential equations. World Scientific, Singapore, 1989, 434 p.

4. Perestyk N.A., Plotnikov V.A., Samoilenko A.M., Skripnik N.V. Differential equations with impulse effect: multivalued right-hand sides with discontinuities. DeGruyter Stud. 40, Math. Walter de Gruter Co., Berlin, 2011.

5. Samoilenko A.M., Perestyk N.A. Impulsive differential equations. World Sci., Singapore, 1995.

6. Stamova I., Stamov, G. Impulsive biological models. In: Applied impulsive mathematical models. CMS Books in Mathematics. Springer, Cham., 2016.

7. Catlla J., Schaeffer D.G., Witelski Th.P., Monson E.E., Lin A.L. On spiking models for synaptic activity and impulsive differential equations. SIAM Review, 2008, 50(3), P. 553–569.

8. Fedorov E.G., Popov I.Yu. Analysis of the limiting behavior of a biological neurons system with delay. J. Phys.: Conf. Ser., 2021, 2086, P. 012109.

9. Fedorov E.G., Popov I.Yu. Hopf bifurcations in a network of Fitzhigh-Nagumo biological neurons. International Journal of Nonlinear Sciences and Numerical Simulation, 2021.

10. Fedorov E.G. Properties of an oriented ring of neurons with the FitzHugh-Nagumo model. Nanosystems: Phys. Chem. Math., 2021, 12(5), P. 553– 562.

11. Anguraj A., Arjunan M.M. Existence and uniqueness of mild and classical solutions of impulsive evolution equations. Elect. J. of Differential Equations, 2005, 2005(111), P. 1–8.

12. Ashyralyev A., Sharifov Y.A. Existence and uniqueness of solutions for nonlinear impulsive differential equations with two-point and integral boundary conditions. Advances in Difference Equations, 2013, 2013, P. 173.

13. Ashyralyev A., Sharifov Y.A. Optimal control problems for impulsive systems with integral boundary conditions. Elect. J. of Differential Equations, 2013, 2013(80), P. 1–11.

14. Bai Ch., Yang D. Existence of solutions for second-order nonlinear impulsive differential equations with periodic boundary value conditions. Boundary Value Problems (Hindawi Publishing Corporation), 2007, 2007(41589), P. 1–13.

15. Bin L., Xinzhi L., Xiaoxin L. Robust global exponential stability of uncertain impulsive systems. Acta Mathematica Scientia, 2005, 25(1), P. 161– 169.

16. Chen J., Tisdell Ch.C., Yuan R. On the solvability of periodic boundary value problems with impulse. J. of Math. Anal. and Appl., 2007, 331, P. 902–912.

17. Mardanov M.J., Sharifov Ya.A., Habib M.H. Existence and uniqueness of solutions for first-order nonlinear differential equations with two-point and integral boundary conditions. Electr. J. of Differential Equations, 2014, 2014(259), P. 1–8.

18. Sharifov Ya.A. Optimal control problem for systems with impulsive actions under nonlocal boundary conditions. Vestnik samarskogo gosudarstvennogo tekhnicheskogo universiteta. Seria: Fiziko-matematicheskie nauki, 2013, 33(4), P. 34–45 (Russian).

19. Sharifov Ya.A. Optimal control for systems with impulsive actions under nonlocal boundary conditions. Russian Mathematics (Izv. VUZ), 2013, 57(2), P. 65–72.

20. Sharifov Y.A., Mammadova N.B. Optimal control problem described by impulsive differential equations with nonlocal boundary conditions. Differential equations, 2014, 50(3), P. 403–411.

21. Sharifov Y.A. Conditions optimality in problems control with systems impulsive differential equations with nonlocal boundary conditions. Ukrainian Math. Journ., 2012, 64(6), P. 836–847.

22. Yuldashev T.K. Periodic solutions for an impulsive system of nonlinear differential equations with maxima. Nanosystems: Phys. Chem. Math., 2022. 13(2), P. 135–141.

23. Yuldashev T.K., Fayziev A.K. On a nonlinear impulsive system of integro-differential equations with degenerate kernel and maxima. Nanosystems: Phys. Chem. Math., 2022, 13(1), P. 36–44.

24. Yuldashev T.K., Fayziev A.K. Integral condition with nonlinear kernel for an impulsive system of differential equations with maxima and redefinition vector. Lobachevskii Journ. Math., 2022, 43(8), P. 2332–2340.

25. Yuldashev T.K., Ergashev T.G., Abduvahobov T.A. Nonlinear system of impulsive integro-differential equations with Hilfer fractional operator and mixed maxima. Chelyabinsk Physical and Mathematical Journal, 2022, 7(3), P. 312–325.

26. Abildayeva A., Assanova A., Imanchiyev A. A multi-point problem for a system of differential equations with piecewise-constant argument of generalized type as a neural network model. Eurasian Math. Journ., 2022, 13(2), P. 8–17.

27. Assanova A.T., Dzhobulaeva Z.K., Imanchiyev A.E. A multi-point initial problem for a non-classical system of a partial differential equations. Lobachevskii Journ. Math., 2020, 41(6), P. 1031–1042.

28. Minglibayeva B.B., Assanova A.T. An existence of an isolated solution to nonlinear twopoint boundary value problem with parameter. Lobachevskii Journ. Math., 2021, 42(3). P. 587–597.

29. Usmanov K.I., Turmetov B.Kh., Nazarova K.Zh. On unique solvability of a multipoint boundary value problem for systems of integro-differential equations with involution. Symmetry, 2022, 14(8), ID 1262, P. 1–15.

30. Yuldashev T.K. On a nonlocal problem for impulsive differential equations with mixed maxima. Vestnik KRAUNTS. Seria: Fiziko-matematicheskie nauki, 2022, 38(1), P. 40–53.