Anishchenko Vadim Semenovich

Publications in Math-Net.Ru

1. Modeling battery systems - problems of nonlinearity, efficiency, aging, coupling, and network setup
   
   Izv. Sarat. Univ. Physics, 22:4 (2022),  288–309
2. Mutual synchronization of complex structures in interacting ensembles of non-locally coupled rotators
   
   Izv. Sarat. Univ. Physics, 21:1 (2021),  4–20
3. Influence of noise on spiral and target wave regimes in two-dimensional lattice of locally coupled maps
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 29:2 (2021),  272–287
4. Synchronization effects in a two-layer network of nonlocally coupled chaotic maps with dissipative and inertial intercoupling
   
   Izv. Sarat. Univ. Physics, 20:1 (2020),  42–54
5. Reflecting, nonlocal, and diagonal coupling topologies in networks of the coupled dynamics elements with various nature
   
   Izv. Sarat. Univ. Physics, 20:1 (2020),  16–28
6. Autowave structures in two-dimensional lattices of nonlocally coupled oscillators
   
   Izvestiya VUZ. Applied Nonlinear Dynamics, 28:3 (2020),  299–323
7. Features of the Synchronization of Spiral Wave Structures in Interacting Lattices of Nonlocally Coupled Maps
   
   Rus. J. Nonlin. Dyn., 16:2 (2020),  243–257
8. Quantifying the Transition from Spiral Waves to Spiral Wave Chimeras in a Lattice of Self-sustained Oscillators
   
   Regul. Chaotic Dyn., 25:6 (2020),  597–615
9. Spatio-temporal structures in ensembles of coupled chaotic systems
   
   UFN, 190:2 (2020),  160–178
10. Chimera structures in ensembles of nonlocally coupled Sprott maps
    
    Izv. Sarat. Univ. Physics, 19:4 (2019),  246–257
11. Spiral wave patterns in two-layer 2D lattices of nonlocally coupled discrete oscillators. Synchronization of spiral wave chimeras
    
    Izv. Sarat. Univ. Physics, 19:3 (2019),  166–177
12. Spatiotemporal structures in an ensemble of nonlocally coupled Nekorkin maps
    
    Izv. Sarat. Univ. Physics, 19:2 (2019),  86–94
13. The influence of the output power of the generators on the frequency characteristics of the grid in a ring topology
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 27:6 (2019),  25–38
14. Spiral, target, and chimera wave structures in a two-dimensional ensemble of nonlocally coupled van der Pol oscillators
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 45:13 (2019),  40–43
15. Impact of Noise on the Amplitude Chimera Lifetime in an Ensemble of Nonlocally Coupled Chaotic Maps
    
    Regul. Chaotic Dyn., 24:4 (2019),  432–445
16. Synchronization of chimera states in ensembles of nonlocally coupled cubic maps
    
    Izv. Sarat. Univ. Physics, 18:2 (2018),  103–111
17. Analysis of synchronous modes of coupled oscillators in power grids
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 26:3 (2018),  62–77
18. Synchronization of Chimera States in Coupled Networks of Nonlinear Chaotic Oscillators
    
    Nelin. Dinam., 14:4 (2018),  419–433
19. Synchronization of Chimera States in a Network of Many Unidirectionally Coupled Layers of Discrete Maps
    
    Regul. Chaotic Dyn., 23:7-8 (2018),  948–960
20. Stability and Noise-induced Transitions in an Ensemble of Nonlocally Coupled Chaotic Maps
    
    Regul. Chaotic Dyn., 23:3 (2018),  325–338
21. Correlation characteristics of phase and amplitude chimeras in an ensemble of nonlocally coupled maps
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 43:2 (2017),  68–75
22. “Coherence–incoherence” Transition in Ensembles of Nonlocally Coupled Chaotic Oscillators with Nonhyperbolic and Hyperbolic Attractors
    
    Regul. Chaotic Dyn., 22:2 (2017),  148–162
23. Poincare recurrences and Afraimovich–Pesin dimension in a nonautonomous conservative oscillator
    
    Izv. Sarat. Univ. Physics, 16:4 (2016),  195–203
24. Noise-induced effects in the double-well oscillator with variable friction
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 24:1 (2016),  5–15
25. Coherence-incoherence transition with appearance of chimera states in a one-dimensional ensemble
    
    Nelin. Dinam., 12:3 (2016),  295–309
26. Amplitude and phase chimeras in an ensemble of chaotic oscillators
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 42:14 (2016),  103–110
27. Compensation for losses in a resonant circuit when using inertial inductive and capacitive two-poles
    
    Izv. Sarat. Univ. Physics, 15:4 (2015),  5–9
28. On the purpose and features of the University education system
    
    Izv. Sarat. Univ. Physics, 15:1 (2015),  74–83
29. Estimating dimensions of chaotic attractors using Poincaré recurrences
    
    Nelin. Dinam., 11:3 (2015),  475–485
30. Poincaré recurrences in a stroboscopic section of a nonautonomous van der Pol oscillator
    
    Nelin. Dinam., 10:2 (2014),  149–156
31. Statistics of Poincaré recurrences in nonautonomous chaotic 1D map
    
    Nelin. Dinam., 10:1 (2014),  3–16
32. Statistics of Poincare recurrence with considering effect of fluctuations
    
    Izv. Sarat. Univ. Physics, 13:2 (2013),  5–15
33. Poincaré recurrence theory and its applications to nonlinear physics
    
    UFN, 183:10 (2013),  1009–1028
34. Coherence resonance and synchronization of stochastic self-sustained oscillations in hard excitation oscillator
    
    Nelin. Dinam., 8:5 (2012),  897–911
35. Poincaré recurrences time and local dimension of chaotic attractors
    
    Nelin. Dinam., 8:3 (2012),  449–460
36. Poincaré recurrences in a system with non-strange chaotic attractor
    
    Nelin. Dinam., 8:1 (2012),  29–41
37. Self-sustained oscillations of dynamical and stochastic systems and their mathematical image — an attractor
    
    Nelin. Dinam., 6:1 (2010),  107–126
38. Numerical and experimental study of external synchronization of two-frequency oscillations
    
    Nelin. Dinam., 5:2 (2009),  237–252
39. The interconnection of synchronization threshold with effective diffusion coefficient of instantaneous phase of chaotic self-sustained oscillations
    
    Nelin. Dinam., 4:2 (2008),  169–180
40. Synchronization mechanisms of resonant limit cycle on two-dimensional torus
    
    Nelin. Dinam., 4:1 (2008),  39–56
41. Multifractal analysis of signals based on wavelet-transform
    
    Izv. Sarat. Univ. Physics, 7:1 (2007),  3–25
42. Multifractal analysis of complex signals
    
    UFN, 177:8 (2007),  859–876
43. Cluster synchronization destruction and chaos in an inhomoceneous active medium
    
    Izv. Sarat. Univ. Physics, 6:1 (2006),  73–81
44. Stability, synchronization and destruction of quasiperiodic motions
    
    Nelin. Dinam., 2:3 (2006),  267–278
45. Anishchenko-Astakhov self-sustained oscillator as one of the basic models of deterministic chaos
    
    Izv. Sarat. Univ. Physics, 5:1 (2005),  54–68
46. Statistical properties of dynamical chaos
    
    UFN, 175:2 (2005),  163–179
47. Stochastic resonance: noise-enhanced order
    
    UFN, 169:1 (1999),  7–38
48. Parameter modulation in a laser with a saturable absorber
    
    Kvantovaya Elektronika, 18:9 (1991),  1066–1069
49. STATISTICAL PROPERTIES OF THE ALTERNATION EFFECT IN QUASI-HYPERBOLIC SYSTEMS
    
    Zhurnal Tekhnicheskoi Fiziki, 60:1 (1990),  3–14
50. TIME OF THE POINCARE RECOVERY IN A DYNAMIC CHAOS MODE
    
    Zhurnal Tekhnicheskoi Fiziki, 59:8 (1989),  117–118
51. UNIVERSAL REGULARITIES OF THE SMOOTH TRANSITION TO CHAOS THROUGH THE DOUBLE-FREQUENCY OSCILLATION REGIME
    
    Zhurnal Tekhnicheskoi Fiziki, 58:5 (1988),  849–858
52. BIFURCATIONS OF ATTRACTORS IN THE PRESENCE OF FLUCTUATIONS
    
    Zhurnal Tekhnicheskoi Fiziki, 58:4 (1988),  641–651
53. Bifurcations and stochasticity induced by an external noise in a laser with a nonlinear absorber
    
    Kvantovaya Elektronika, 15:9 (1988),  1885–1894
54. Increasing the correlation length under the chaos-chaos-type alternation
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 13:17 (1987),  1063–1066
55. DESTRUCTION OF TRIFREQUENT OSCILLATIONS AND THE CHAOS IN THE GENERATOR DURING THE BIHARMONIC EFFECT
    
    Zhurnal Tekhnicheskoi Fiziki, 56:11 (1986),  2250–2253
56. DESTRUCTIONS OF QUASI-PERIODIC OSCILLATIONS AND CHAOS IN DISSIPATIVE SYSTEMS
    
    Zhurnal Tekhnicheskoi Fiziki, 56:2 (1986),  225–237
57. Noise-induced exponential dispersion of phase trajectories near regular attractors
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 12:12 (1986),  740–744
58. TRANSITIONS TO STOCHASTICITY IN THE INERTIAL DELAYED GENERATOR - PROBLEM OF THE FINITE-DIMENSIONAL DESCRIPTION
    
    Zhurnal Tekhnicheskoi Fiziki, 55:1 (1985),  162–167
59. Dimensions and physical-properties of chaotic attractors in the chain of coupled generators
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 11:24 (1985),  1505–1509
60. Critical phenomena during harmonic modulations of 2-frequency auto-oscillations. Transitions through 3-dimensional torus to chaos
    
    Pisma v Zhurnal Tekhnicheskoi Fiziki, 11:9 (1985),  536–541
61. EFFECT OF THE COUPLING ON DYNAMIC-SYSTEMS OF NEAR TRANSITION POINT TO STOCHASTICITY BY DOUBLING
    
    Zhurnal Tekhnicheskoi Fiziki, 54:4 (1984),  844–846
62. BIFURCATION PHENOMENA IN AUTOSTOCHASTIC GENERATOR UNDER THE EXTERNAL REGULAR EFFECT
    
    Zhurnal Tekhnicheskoi Fiziki, 53:11 (1983),  2165–2170
63. EXPERIMENTAL-STUDY OF THE STRUCTURE OF A STRANGE ATTRACTOR IN THE MODEL OF GENERATORS WITH INERTION NONLINEARITY
    
    Zhurnal Tekhnicheskoi Fiziki, 53:1 (1983),  152–154


64. In memory of professor Lutz Schimansky-Geier
    
    Izv. Sarat. Univ. Physics, 21:1 (2021),  86–87
65. Radiophysics and nonlinear dynamics: Textbook
    
    Izvestiya VUZ. Applied Nonlinear Dynamics, 26:6 (2018),  99–101
66. In memory of Leonid Pavlovich Shilnikov
    
    Nelin. Dinam., 8:1 (2012),  187–190
67. Diagnostics of the degree of noise influence on a nonlinear system using relative metric entropy
    
    Regul. Chaotic Dyn., 15:2-3 (2010),  261–273
68. Professor V.I. Kalinin and University education
    
    Izv. Sarat. Univ. Physics, 7:1 (2007),  58–64
69. Venedikt Ivanovich Kalinin (1907 - 1960)
    
    Izv. Sarat. Univ. Physics, 7:1 (2007),  49–58