Antonovskaya Ol'ga Georgievna

Publications in Math-Net.Ru

1. On preservation of the quadratic Lyapunov function of a linear discrete system Under stationary perturbations of the system coefficients
   
   Meždunar. nauč.-issled. žurn., 2024, no. 2(140),  1–6
2. Algebraic criterion and robustness of the stability margin of a discrete dynamic system
   
   Meždunar. nauč.-issled. žurn., 2023, no. 5(131),  1–4
3. Toward robust stability margin evaluation in continuous and discrete systems
   
   Meždunar. nauč.-issled. žurn., 2023, no. 3(129),  1–7
4. On the study of robust stability and aperiodicity of continuous and discrete systems
   
   Meždunar. nauč.-issled. žurn., 2022, no. 3(117),  7–12
5. On the study of a system close to a harmonic oscillator via approximate point mapping
   
   Meždunar. nauč.-issled. žurn., 2021, no. 8(110),  6–12
6. On the effect of nonlinearity types on the results of studying the synchronization of quasi-harmonic oscillator via approximate point mapping
   
   Meždunar. nauč.-issled. žurn., 2021, no. 1(103),  22–29
7. On study of quasiharmonic oscillator with nonlinearity and saturation
   
   Meždunar. nauč.-issled. žurn., 2020, no. 2(92),  10–18
8. Application of quadratic Lyapunov functions to investigation of stability of systems with delay
   
   Izv. Vyssh. Uchebn. Zaved. Mat., 2019, no. 10,  15–20
9. On investigation of forced synchronization by the method of approximated point mappings
   
   Meždunar. nauč.-issled. žurn., 2018, no. 8(74),  7–14
10. A lication of Lyapunov’s quadratic functions in solving a lied dynamic problems
    
    Meždunar. nauč.-issled. žurn., 2017, no. 8-2(62),  142–147
11. Construction of the condition-extremal Lyapunov functions in studies of the trajectories behavior of continuous dynamic systems on a plane
    
    Meždunar. nauč.-issled. žurn., 2017, no. 8-2(62),  135–142
12. On a method of evaluation of attraction domain for fixed point of nonlinear point mapping of arbitrary dimension
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2016, no. 12,  12–18
13. Modeling the process of gluing phase trajectories in systems with a combined frequency-phase control
    
    Izv. IMI UdGU, 2015, no. 2(46),  6–12
14. Construction of Lyapunov quadratic functions that satisfy given constraints for continuous and discrete dynamical systems
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 2004, no. 2,  19–23
15. On the Maximum Possible Negativity Margin for the First Derivative (First Difference) of a Quadratic Lyapunov Function
    
    Differ. Uravn., 39:11 (2003),  1562–1563