Geodesic
Matrix equations of the system of phase synchronization
Čebyševskij sbornik, Tome 20 (2019) no. 2, pp. 244-258.

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The system of matrix Lurie equations is considered. Such a system is of practical importance in the study of the asymptotic stability of equilibrium states of a system of differential equations, finding the regions of attraction of equilibrium states, determining the conditions for the existence of limit cycles for systems of differential equations, investigating global stability, hidden synchronization of phase and frequency-frequency self-tuning systems. It is known that the conditions for the solvability of the matrix Lurie equations are determined by the "Yakubovich–Kalman frequency theorem". To study nonlinear oscillations of phase systems, it becomes necessary to find solutions of the matrix Lurie equations. In this paper we consider the case when the matrix Lyapunov inequality, which is part of the Lurie equation, has a matrix with real eigenvalues, some of which may be zero. For such a case, necessary and sufficient conditions for the solvability of the Lurie equations are obtained and the form of the solutions is determined, which makes it possible to carry out their spectral analysis. The explicit form of the solutions of the matrix equations made it possible to make their geometric interpretation depending on the spectrum, to show the relationship of the linear connection equation to the quadratic forms of solutions of the Lurie equations. The method of analyzing matrix equations is based on an approach based on the use of a direct product of matrices and the application of generalized inverse matrices to find solutions to systems of linear equations. The results of the work made it possible to investigate the system of three matrix equations arising in the study of phase-frequency frequency-phase self-tuning systems.
Keywords: system of differential equations, matrix Lurie equations, hidden synchronization, frequency-phase frequency-locked loop. 
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S. S. Mamonov; I. V. Ionova; A. O. Harlamova. Matrix equations of the system of phase synchronization. Čebyševskij sbornik, Tome 20 (2019) no. 2, pp. 244-258. http://geodesic.mathdoc.fr/item/CHEB_2019_20_2_a18/

[1] Ikramov Kh. D., Numerical solution of matrix equations, Nauka, M., 1984, 192 pp. | MR

[2] Prasolov V. V., Problems and theorems of linear algebra, Nauka, M., 1996, 304 pp.

[3] Churilov A. N., “On the solvability of matrix inequalities”, Mathematical Notes, 36:5 (1984,), 725–732 | MR | Zbl

[4] Horn R., Johnson Ch., Matrix analysis, Mir, M., 1989, 655 pp. | MR

[5] Gelig A. Kh., Leonov G. A., Yakubovich V. A., The stability of nonlinear systems with nonunique equilibrium, Nauka, M., 1978, 400 pp.

[6] Leonov G. A., Burkin I. M., Shepelyavy A. I., Frequency methods in the theory of oscillations, Science Publ. of St. Petersburg State University, SPb., 1992 | MR

[7] Yakubovich V. A., “Solution of certain matrix inequalities encountered in the theory of automatic control”, Dokl. AN SSSR, 143:6 (1962), 1304–1307 | Zbl

[8] Leonov G. A., Smirnova V. B., Mathematical problems of the theory of phase synchronization, Science Publ., SPb., 2000, 400 pp.

[9] Gelig A. Kh., Leonova G. A., Fradkov A. L., Nonlinear systems. Frequency and matrix inequalities, Fizmatlit, M., 2008, 608 pp.

[10] Mamonov S. S., Ionova I. V., “Investigation of the beats of the search system of phase-locked loop frequency”, Bulletin of the Ryazan State Radio Engineering University, 2014, no. 48, 52–59

[11] Ionova I. V., “A numerical-analytical approach to constructing a domain of initial conditions for cycles of the second kind”, Bulletin of the Russian Academy of Natural Sciences. Differential equations, 2015, no. 3, 49–55

[12] Mamonov S. S., Kharlamova A. O., “Quasisynchronous regimes of the phase system”, Bulletin of the Ryazan State Radio Engineering University, 2016, no. 56, 45–51

[13] Mamonov S. S., Kharlamova A. O., “Forced synchronization of phase-locked loop systems with delay”, Bulletin of the Ryazan State Radio Engineering University, 2017, no. 62, 26–35

[14] Mamonov S. S., Kharlamova A. O., “Determination of the conditions for the existence of limit cycles of the first kind of systems with cylindrical phase space”, Journal of the Srednevolzhsky Mathematical Society, 19:1 (2017), 67–76 | MR | Zbl

[15] Kharlamova A. O., “Limit cycles of the first kind of phase systems”, Bulletin of the Russian Academy of Natural Sciences. Differential equations, 2016, no. 16, 68–74

[16] Mamonov S. S., “Solution of matrix inequalities”, Differential equations (qualitative theory), interuniversity. Sat. sci. tr., Publ. of the RSPU, Ryazan, 1994, 71–74

[17] Mamonov S. S., Ionova I. V., “Solution of the system of matrix equations in the presence of linear coupling”, Izvestiya Tula State University. Natural Sciences, 2014, no. 2, 90–102 | MR

[18] Shalfeev V. D., Matrosov V. V., Nonlinear dynamics of phase synchronization systems, Publ. of the UNN, N. Novgorod, 2013