Bezruchko Boris Petrovich

Publications in Math-Net.Ru

1. Adaptation of the method of coupling analysis based on phase dynamics modeling to EEG signals during an epileptic seizure in comatose patients
   
   Izv. Sarat. Univ. Physics, 22:1 (2022),  4–14
2. The method for diagnostics of the phase synchronization of the vegetative control of blood circulation in real time
   
   Izv. Sarat. Univ. Physics, 21:3 (2021),  213–221
3. Development of a digital finger photoplethysmogram sensor
   
   Izv. Sarat. Univ. Physics, 21:1 (2021),  58–68
4. Increasing the sensitivity of real-time method for diagnostic of autogenerators phase synchronization based on their non-stationary time series
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 29:6 (2021),  892–904
5. Experimental studies of chaotic dynamics near the theorist
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 29:1 (2021),  88–135
6. The reconstruction of the couplings structure in the ensemble of oscillators according to the time series via phase dynamics modeling
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 27:1 (2019),  41–52
7. The influence of observational noise on the effect of spurious coupling between oscillators as estimated from their time series
   
   Pisma v Zhurnal Tekhnicheskoi Fiziki, 45:16 (2019),  6–9
8. Phase synchronization of elements of autonomic control in mathematical model of cardiovascular system
   
   Nelin. Dinam., 13:3 (2017),  381–397
9. Influence of nonlinear amplitude dynamics on estimated delay time of coupling between self-oscillatory systems
   
   Pisma v Zhurnal Tekhnicheskoi Fiziki, 42:6 (2016),  20–26
10. Phase dynamics modeling technique for estimation of delayed couplings between nonlinear oscillators accounting for influence of amplitudes
    
    Izv. Sarat. Univ. Physics, 15:4 (2015),  28–37
11. Model of cardiovascular system autonomic regulation with a circuit of baroreflectory control of mean arterial pressure in the form of delayed-feedback oscillator
    
    Izv. Sarat. Univ. Physics, 15:2 (2015),  32–38
12. Route to synerge­tics: Excursus in ten lectures
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 22:6 (2014),  137–140
13. Optimal selection of parameters of the forecasting models used for the nonlinear Granger causality method in application to the signals with a main time scales
    
    Nelin. Dinam., 10:3 (2014),  279–295
14. Modeling nonlinear oscillatory systems and diagnostics of coupling between them using chaotic time series analysis: applications in neurophysiology
    
    UFN, 178:3 (2008),  323–329
15. Contemporary problems in modeling from time series
    
    Izv. Sarat. Univ. Physics, 6:1 (2006),  3–27
16. Multistability in oscillation systems with period doubling and unidirectional coupling
    
    Dokl. Akad. Nauk SSSR, 314:2 (1990),  332–336
17. TYPES OF OSCILLATIONS AND THEIR EVOLUTION IN DISSIPATIVELY-RELATED FEIGENBAUM SYSTEMS
    
    Zhurnal Tekhnicheskoi Fiziki, 60:10 (1990),  19–26
18. О возможности появления хаотических решений в модели узкозонного полупроводника в режиме ударной ионизации
    
    Fizika i Tekhnika Poluprovodnikov, 23:9 (1989),  1707–1709
19. MULTISTABLE STATES OF DISSIPATIVELY-CONNECTED FEIGENBAUM SYSTEM
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 15:3 (1989),  60–65
20. PECULIARITIES OF ORIGINATION OF QUASIPERIODIC MOMENTS IN THE DISSIPATIVELY RELATED NONLINEAR OSCILLATOR SYSTEM UNDER THE OUTER PERIODIC EFFECT
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 14:1 (1988),  37–41
21. Change of the structure of stochastic-system plane breakdown under the excitation of additional mode
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 13:8 (1987),  449–452
22. A new type of critical behavior in coupled systems at the transition to chaos
    
    Dokl. Akad. Nauk SSSR, 287:3 (1986),  619–622