https://orcid.org/0000-0003-3008-1078
References
- D.M. Abrams and S.H. Strogatz, Chimera states for coupled oscillators, Phys. Rev. Lett. 93 (2004), p. Aritcle ID 174102.
- V.S. Anishchenko, A.B. Neiman, F. Moss, and L. Schimansky-Geier, Stochastic resonance: Noise-enhanced order, Phys. Uspekhi 42 (1999), pp. 7.
- V.S. Anishchenko, T.E. Vadivasova, and G.I. Strelkova, Deterministic Nonlinear Systems, Springer Series in Synergetics, Springer, 2014.
- L. Arnold, Random dynamical systems, in Dynamical Systems. Lecture Notes in Mathematics, 1609 Springer, Berlin, Heidelberg, 1995. pp. 1–43.
- K. Bansal, J.O. Garcia, S.H. Tompson, T. Verstynen, J.M. Vettel, and S.F. Muldoon, Cognitive chimera states in human brain networks, Sci. Adv. 5 (2019), p. Article ID eaau8535.
- I. Bashkirtseva, L. Ryashko, and H. Schurz, Analysis of noise-induced transitions for Hopf system with additive and multiplicative random disturbances, Chaos Soliton Fract. 39 (2009), pp. 72–82.
- R. Benzi, A. Sutera, and A. Vulpiani, The mechanism of stochastic resonance, J. Phys. A Math. Gen.14 (1981), p. L453.
- R. Berner, A. Polanska, E. Schöll, and S. Yanchuk, Solitary states in adaptive nonlocal oscillator networks, Eur. Phys. J. Spec. Top. 229 (2020), pp. 2183–2203.
- R. Berner, S. Yanchuk, and E. Schöll, What adaptive neuronal networks teach us about power grids, Phys. Rev. E. 103 (2021), p. Article ID 042315.
- S.A. Bogomolov, A.V. Slepnev, G.I. Strelkova, E. Schöll, and V.S. Anishchenko, Mechanisms of appearance of amplitude and phase chimera states in ensembles of nonlocally coupled chaotic systems, Commun. Nonlinear Sci. Numer. Simul. 43 (2017), pp. 25–36.
- A. Bukh, E. Rybalova, N. Semenova, G. Strelkova, and V. Anishchenko, New type of chimera and mutual synchronization of spatiotemporal structures in two coupled ensembles of nonlocally interacting chaotic maps, Chaos Interdisci. J. Nonlinear Sci. 27 (2017), p. Article ID 111102.
- A.V. Bukh, A.V. Slepnev, V.S. Anishchenko, and T.E. Vadivasova, Stability and noise-induced transitions in an ensemble of nonlocally coupled chaotic maps, Regul. Chaotic Dyn. 23 (2018), pp. 325–338.
- M.J. Chacron, A. Longtin, and L. Maler, The effects of spontaneous activity, background noise, and the stimulus ensemble on information transfer in neurons, Netw. Comput. Neural Syst. 14 (2003), pp. 803–824.
- A. Destexhe and M. Rudolph-Lilith, Neuronal Noise, Vol. 8, Springer Science & Business Media, 2012.
- M.J. Feigenbaum, Quantitative universality for a class of nonlinear transformations, J. Stat. Phys. 19 (1978), pp. 25–52.
- M.J. Feigenbaum, The universal metric properties of nonlinear transformations, J. Stat. Phys. 21 (1979), pp. 669–706.
- I. Franović, S. Eydam, N. Semenova, and A. Zakharova, Unbalanced clustering and solitary states in coupled excitable systems, Chaos Interdisci. J. Nonlinear Sci. 32 (2022), p. Article ID 011104.
- L.V. Gambuzza, A. Buscarino, S. Chessari, L. Fortuna, R. Meucci, and M. Frasca, Experimental investigation of chimera states with quiescent and synchronous domains in coupled electronic oscillators, Phys. Rev. E. 90 (2014), p. Article ID 032905.
- L. Gammaitoni, F. Marchesoni, E. Menichella-Saetta, and S. Santucci, Stochastic resonance in bistable systems, Phys. Rev. Lett. 62 (1989), p. 349.
- J.C. González-Avella, M.G. Cosenza, and M. San Miguel, Localized coherence in two interacting populations of social agents, Phys. A Stat. Mech. Appl. 399 (2014), pp. 24–30.
- A.M. Hagerstrom, T.E. Murphy, R. Roy, P. Hövel, I. Omelchenko, and E. Schöll, Experimental observation of chimeras in coupled-map lattices, Nat. Phys. 8 (2012), pp. 658–661.
- F. Hellmann, P. Schultz, P. Jaros, R. Levchenko, T. Kapitaniak, J. Kurths, and Y. Maistrenko, Network-induced multistability through lossy coupling and exotic solitary states, Nat. Commun. 11 (2020), pp. 1–9.
- M. Henon, Numerical study of quadratic area-preserving mappings, Quart. Appl. Math. 27(3) (1969), pp. 291–312.
- S. Hong and Y. Chun, Efficiency and stability in a model of wireless communication networks, Soc. Choice. Welfare. 34 (2010), pp. 441–454.
- W. Horsthemke and R. Lefever, Noise-Induced Transitions in Physics, Chemistry, and Biology, in Noise-Induced Transitions. Springer Series in Synergetics.15.Springer, Berlin, Heidelberg, 1984. pp. 164–200.
- P. Jaros, Y. Maistrenko, and T. Kapitaniak, Chimera states on the route from coherence to rotating waves, Phys. Rev. E. 91 (2015), p. Article ID 022907.
- P. Jaros, S. Brezetsky, R. Levchenko, D. Dudkowski, T. Kapitaniak, and Y. Maistrenko, Solitary states for coupled oscillators with inertia, Chaos Interdisci. J. Nonlinear Sci. 28 (2018), p. Article ID 011103.
- T. Kapitaniak, P. Kuzma, J. Wojewoda, K. Czolczynski, and Y. Maistrenko, Imperfect chimera states for coupled pendula, Sci. Rep. 4 (2014), p. 6379.
- Y. Kuramoto and D. Battogtokh, Coexistence of coherence and incoherence in nonlocally coupled phase oscillators, Nonlinear Phenom. Complex Syst. 5 (2002), pp. 380–385.
- L. Larger, B. Penkovsky, and Y. Maistrenko, Virtual chimera states for delayed-feedback systems, Phys. Rev. Lett. 111 (2013), p. Article ID 054103.
- B. Lindner and L. Schimansky-Geier, Analytical approach to the stochastic FitzHugh-Nagumo system and coherence resonance, Phys. Rev. E. 60 (1999), p. 7270.
- S.A. Loos, J.C. Claussen, E. Schöll, and A. Zakharova, Chimera patterns under the impact of noise, Phys. Rev. E. 93 (2016), p. Article ID 012209.
- R. Lozi, Un attracteur étrange (?) du type attracteur de Hénon, J. Phys. Colloques 39 (1978), pp. C5–9.
- Y. Maistrenko, B. Penkovsky, and M. Rosenblum, Solitary state at the edge of synchrony in ensembles with attractive and repulsive interactions, Phys. Rev. E. 89 (2014), p. Article ID 060901.
- S. Majhi, B.K. Bera, D. Ghosh, and M. Perc, Chimera states in neuronal networks: A review, Phys. Life. Rev. 28 (2019), pp. 100–121.
- A.K. Malchow, I. Omelchenko, E. Schöll, and P. Hövel, Robustness of chimera states in nonlocally coupled networks of nonidentical logistic maps, Phys. Rev. E. 98 (2018), p. 012217.
- E.A. Martens, S. Thutupalli, A. Fourriere, and O. Hallatschek, Chimera states in mechanical oscillator networks, Proc. Nat. Acad. Sci. 110 (2013), pp. 10563–10567.
- M.D. McDonnell and L.M. Ward, The benefits of noise in neural systems: Bridging theory and experiment, Nat. Rev. Neurosci. 12 (2011), pp. 415–425.
- P.J. Menck, J. Heitzig, J. Kurths, and H.J. Schellnhuber, How dead ends undermine power grid stability, Nat. Commun. 5 (2014), pp. 1–8.
- M. Mikhaylenko, L. Ramlow, S. Jalan, and A. Zakharova, Weak multiplexing in neural networks: Switching between chimera and solitary states, Chaos Interdisci. J. Nonlinear Sci. 29 (2019), p. Article ID 023122.
- A.E. Motter, S.A. Myers, M. Anghel, and T. Nishikawa, Spontaneous synchrony in power-grid networks, Nat. Phys. 9 (2013), pp. 191–197.
- V.A. Nechaev, E.V. Rybalova, and G.I. Strelkova, Influence of parameters inhomogeneity on the existence of chimera states in a ring of nonlocally coupled maps, Izvestiya VUZ. Appl. Nonlinear Dyn.29 (2021), pp. 943–952.
- A. Neiman, Synchronizationlike phenomena in coupled stochastic bistable systems, Phys. Rev. E. 49 (1994), pp. 3484.
- N.N. Nikishina, E.V. Rybalova, G.I. Strelkova, and T.E. Vadivasova, Destruction of cluster structures in an ensemble of chaotic maps with noise-modulated nonlocal coupling, Reg. Chaotic Dyn. 27 (2022), pp. 242–251. (accepted).
- I. Omelchenko, Y. Maistrenko, P. Hövel, and E. Schöll, Loss of coherence in dynamical networks: Spatial chaos and chimera states, Phys. Rev. Lett. 106 (2011), p. Article ID 234102.
- I. Omelchenko, B. Riemenschneider, P. Hövel, Y. Maistrenko, and E. Schöll, Transition from spatial coherence to incoherence in coupled chaotic systems, Phys. Rev. E. 85 (2012), p. Article ID 026212.
- I. Omelchenko, A. Provata, J. Hizanidis, E. Schöll, and P. Hövel, Robustness of chimera states for coupled FitzHugh-Nagumo oscillators, Phys. Rev. E. 91 (2015), p. Article ID 022917.
- M.J. Panaggio and D.M. Abrams, Chimera states on a flat torus, Phys. Rev. Lett. 110 (2013), p. Article ID 094102.
- M.J. Panaggio and D.M. Abrams, Chimera states: Coexistence of coherence and incoherence in networks of coupled oscillators, Nonlinearity 28 (2015), p. R67.
- Y.B. Pesin, Dynamical systems with generalized hyperbolic attractors: Hyperbolic, ergodic and topological properties, Ergodic Theory Dyn. Syst. 12 (1992), pp. 123–151.
- A.S. Pikovsky and J. Kurths, Coherence resonance in a noise-driven excitable system, Phys. Rev. Lett. 78 (1997), p. 775.
- A.N. Pisarchik and U. Feudel, Control of multistability, Phys. Rep. 540 (2014), pp. 167–218.
- D.P. Rosin, D. Rontani, N.D. Haynes, E. Schöll, and D.J. Gauthier, Transient scaling and resurgence of chimera states in networks of Boolean phase oscillators, Phys. Rev. E.90 (2014), p. Article ID 030902.
- E. Rybalova, N. Semenova, G. Strelkova, and V. Anishchenko, Transition from complete synchronization to spatio-temporal chaos in coupled chaotic systems with nonhyperbolic and hyperbolic attractors, Euro. Phys. J. Spec. Top. 226 (2017), pp. 1857–1866.
- E. Rybalova, V. Anishchenko, G. Strelkova, and A. Zakharova, Solitary states and solitary state chimera in neural networks, Chaos Interdisci. J. Nonlinear Sci. 29 (2019), p. Article ID 071106.
- E.V. Rybalova, D.Y. Klyushina, V.S. Anishchenko, and G.I. Strelkova, Impact of noise on the amplitude chimera lifetime in an ensemble of nonlocally coupled chaotic maps, Regul. Chaotic Dyn.24 (2019), pp. 432–445.
- E. Rybalova, G. Strelkova, and V. Anishchenko, Mechanism of realizing a solitary state chimera in a ring of nonlocally coupled chaotic maps, Chaos Soliton Fract. 115 (2018), pp. 300–305.
- J. Sawicki, I. Omelchenko, A. Zakharova, and E. Schöll, Chimera states in complex networks: Interplay of fractal topology and delay, Euro. Phys. J. Spec. Top. 226 (2017), pp. 1883–1892.
- L. Schmidt, K. Schönleber, K. Krischer, and V. García-Morales, Coexistence of synchrony and incoherence in oscillatory media under nonlinear global coupling, Chaos Interdisci. J. Nonlinear Sci. 24 (2014), p. Article ID 013102.
- E. Schöll, Synchronization patterns and chimera states in complex networks: Interplay of topology and dynamics, Euro. Phys. J. Spec. Top. 225 (2016), pp. 891–919.
- E. Schöll, Chimeras in physics and biology: Synchronization and desynchronization of rhythms, Nova. Acta. Leopold. 425 (2021), pp. 67–95.
- E. Schöll, Partial synchronization patterns in brain networks, Europhys. Lett.136 (2021), p. Article ID 18001.
- E. Schöll, A. Zakharova, and R.G. Andrzejak, Chimera States in Complex Networks, Frontiers Media SA, 2020.
- L. Schülen, S. Ghosh, A.D. Kachhvah, A. Zakharova, and S. Jalan, Delay engineered solitary states in complex networks, Chaos Soliton Fract. 128 (2019), pp. 290–296.
- L. Schülen, D.A. Janzen, E.S. Medeiros, and A. Zakharova, Solitary states in multiplex neural networks: Onset and vulnerability, Chaos Soliton Fract. 145 (2021), p. Article ID 110670.
- V. Semenov, A. Zakharova, Y. Maistrenko, and E. Schöll, Delayed-feedback chimera states: Forced multiclusters and stochastic resonance, EPL (Euro. Lett.) 115 (2016), p. Article ID 10005.
- N. Semenova, A. Zakharova, E. Schöll, and V. Anishchenko, Does hyperbolicity impede emergence of chimera states in networks of nonlocally coupled chaotic oscillators?, EPL (Euro. Lett.) 112 (2015), p. Article ID 40002.
- N. Semenova, A. Zakharova, V. Anishchenko, and E. Schöll, Coherence-resonance chimeras in a network of excitable elements, Phys. Rev. Lett. 117 (2016), p. Article ID 014102.
- N.I. Semenova, E.V. Rybalova, G.I. Strelkova, and V.S. Anishchenko, ‘Coherence–incoherence’ transition in ensembles of nonlocally coupled chaotic oscillators with nonhyperbolic and hyperbolic attractors, Reg. Chaotic Dyn. 22 (2017), pp. 148–162.
- N. Semenova, G. Strelkova, V. Anishchenko, and A. Zakharova, Temporal intermittency and the lifetime of chimera states in ensembles of nonlocally coupled chaotic oscillators, Chaos Interdisci. J. Nonlinear Sci. 27 (2017), p. Article ID 061102.
- N. Semenova, T. Vadivasova, and V. Anishchenko, Mechanism of solitary state appearance in an ensemble of nonlocally coupled Lozi maps, Euro. Phys. J. Spec. Top. 227 (2018), pp. 1173–1183.
- S. Shima and Y. Kuramoto, Rotating spiral waves with phase-randomized core in nonlocally coupled oscillators, Phys. Rev. E. 69 (2004), p. Article ID 036213.
- B. Shulgin, A. Neiman, and V. Anishchenko, Mean switching frequency locking in stochastic bistable systems driven by a periodic force, Phys. Rev. Lett. 75 (1995), pp. 4157.
- H. Taher, S. Olmi, and E. Schöll, Enhancing power grid synchronization and stability through time-delayed feedback control, Phys. Rev. E. 100 (2019), p. Article ID 062306.
- M.R. Tinsley, S. Nkomo, and K. Showalter, Chimera and phase-cluster states in populations of coupled chemical oscillators, Nat. Phys. 8 (2012), pp. 662–665.
- S. Ulonska, I. Omelchenko, A. Zakharova, and E. Schöll, Chimera states in networks of Van der Pol oscillators with hierarchical connectivities, Chaos Interdisci. J. Nonlinear Sci. 26 (2016), p. Article ID 094825.
- T.E. Vadivasova, G.I. Strelkova, S.A. Bogomolov, and V.S. Anishchenko, Correlation analysis of the coherence-incoherence transition in a ring of nonlocally coupled logistic maps, Chaos Interdisci. J. Nonlinear Sci. 26 (2016), p. Article ID 093108.
- B. Wang, H. Suzuki, and K. Aihara, Enhancing synchronization stability in a multi-area power grid, Sci. Rep. 6 (2016), pp. 1–11.
- M. Wickramasinghe and I.Z. Kiss, Spatially organized dynamical states in chemical oscillator networks: Synchronization, dynamical differentiation, and chimera patterns, PLoS. One. 8 (2013), p. Article ID e80586.
- H. Wu and M. Dhamala, Dynamics of Kuramoto oscillators with time-delayed positive and negative couplings, Phys. Rev. E. 98 (2018), p. Article ID 032221.
- A. Zakharova, Chimera Patterns in Networks: Interplay Between Dynamics, Structure, Noise, and Delay, Springer Nature, 2020.
- A. Zakharova, M. Kapeller, and E. Schöll, Chimera death: Symmetry breaking in dynamical networks, Phys. Rev. Lett. 112 (2014), p. Article ID 154101.
- A. Zakharova, S. Loos, J. Siebert, A. Gjurchinovski, and E. Schöll, Chimera patterns: Influence of time delay and noise, IFAC-PapersOnLine 48 (2015), pp. 7–12.