Abstract
In this chapter, we analyze a nonlocal ring network of adaptively coupled phase oscillators. We observe a variety of frequency synchronized states such as phase-locked, multicluster and solitary states. For an important subclass of the phase-locked solutions, the rotating waves, we provide a rigorous stability analysis. This analysis shows a strong dependence of their stability on the coupling structure and the wavenumber which is a remarkable difference to an all-to-all coupled network. A special type of multicluster states are solitary states which have been observed in a plethora of dynamical systems. We show how solitary states emerge due to the adaptive feature of the network and classify several bifurcation scenarios in which these states are created and stabilized.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
References
Compte A, Sanchez-Vives MV, McCormick DA, Wang XJ (2003) Cellular and network mechanisms of slow oscillatory activity (\(<\)1 Hz) and wave propagations in a cortical network model. J Neurophys 89:2707
Sporns O (2011) Networks of the brain. MIT Press, Cambridge
Popovych OV, Yanchuk S, Tass P (2011) Delay- and coupling-induced firing patterns in oscillatory neural loops. Phys Rev Lett 107:228102
Yanchuk S, Perlikowski P, Popovych OV, Tass P (2011) Variability of spatio-temporal patterns in non-homogeneous rings of spiking neurons. Chaos 21:047511
Pasemann F (1995) Characterization of periodic attractors in neural ring networks. Neural Netw 8:421
Bressloff PC, Coombes S, de Souza B (1997) Dynamics of a ring of pulse-coupled oscillators: group-theoretic approach. Phys Rev Lett 79:2791
Yanchuk S, Wolfrum M (2008) Destabilization patterns in chains of coupled oscillators. Phys Rev E 77:26212
Bonnin M (2009) Waves and patterns in ring lattices with delays. Phys D 238:77
Zou W, Zhan M (2009) Splay states in a ring of coupled oscillators: from local to global coupling. SIAM J Appl Dyn Syst 8:1324
Horikawa Y, Kitajima H (2009) Duration of transient oscillations in ring networks of unidirectionally coupled neurons. Phys D 238:216
Perlikowski P, Yanchuk S, Popovych OV, Tass P (2010) Periodic patterns in a ring of delay-coupled oscillators. Phys Rev E 82:036208
Omelchenko I, Maistrenko Y, Hövel P, Schöll E (2011) Loss of coherence in dynamical networks: spatial chaos and chimera states. Phys Rev Lett 106:234102
Kantner M, Yanchuk S (2013) Bifurcation analysis of delay-induced patterns in a ring of Hodgkin-Huxley neurons. Phil Trans R Soc A 371:20120470
Omelchenko I, Omel’chenko OE, Hövel P, Schöll E (2013) When nonlocal coupling between oscillators becomes stronger: patched synchrony or multichimera states. Phys Rev Lett 110:224101
Yanchuk S, Perlikowski P, Wolfrum M, Stefanski A, Kapitaniak T (2015) Amplitude equations for collective spatio-temporal dynamics in arrays of coupled systems. Chaos 25:033113
Klinshov V, Shchapin D, Yanchuk S, Wolfrum M, D’Huys O, Nekorkin VI (2017) Embedding the dynamics of a single delay system into a feed-forward ring. Phys Rev E 96:042217
Burylko O, Mielke A, Wolfrum M, Yanchuk S (2018) Coexistence of Hamiltonian-like and dissipative dynamics in rings of coupled phase oscillators with skew-symmetric coupling. SIAM J Appl Dyn Syst 17:2076
Omel’chenko OE (2018) The mathematics behind chimera states. Nonlinearity 31:R121
Aoki T, Aoyagi T (2009) Co-evolution of phases and connection strengths in a network of phase oscillators. Phys Rev Lett 102:034101
Aoki T, Aoyagi T (2011) Self-organized network of phase oscillators coupled by activity-dependent interactions. Phys Rev E 84:066109
Nekorkin VI, Kasatkin DV (2016) Dynamics of a network of phase oscillators with plastic couplings. AIP Conf Proc 1738:210010
Kasatkin DV, Yanchuk S, Schöll E, Nekorkin VI (2017) Self-organized emergence of multi-layer structure and chimera states in dynamical networks with adaptive couplings. Phys Rev E 96:062211
Kasatkin DV, Nekorkin VI (2018) The effect of topology on organization of synchronous behavior in dynamical networks with adaptive couplings. Eur Phys J Spec Top 227:1051
Berner R, Schöll E, Yanchuk S (2019) Multiclusters in networks of adaptively coupled phase oscillators. SIAM J Appl Dyn Syst 18:2227
Berner R, Fialkowski J, Kasatkin DV, Nekorkin VI, Yanchuk S, Schöll E (2019) Hierarchical frequency clusters in adaptive networks of phase oscillators. Chaos 29:103134
Berner R, Vock S, Schöll E, Yanchuk S (2021) Desynchronization transitions in adaptive networks. Phys Rev Lett 126:028301
Vock S, Berner R, Yanchuk S, Schöll E (2021) Effect of diluted connectivities on cluster synchronization of adaptively coupled oscillator networks. arXiv:2101.05601
Gray RM (2006) Toeplitz and circulant matrices: a review, Foundations and Trends in Communications and Information Theory, vol 2. Now Publishers Inc., Hanover, pp 155–239
Berner R, Polanska A, Schöll E, Yanchuk S (2020) Solitary states in adaptive nonlocal oscillator networks. Eur Phys J Spec Top 229:2183
Korte B, Vygen J (2018) Combinatorial optimization. Springer, Berlin
Maistrenko Y, Penkovsky B, Rosenblum M (2014) Solitary state at the edge of synchrony in ensembles with attractive and repulsive interactions. Phys Rev E 89:060901
Ashwin P, Burylko O (2015) Weak chimeras in minimal networks of coupled phase oscillators. Chaos 25:013106
Semenov V, Zakharova A, Maistrenko Y, Schöll E (2016) Delayed-feedback chimera states: forced multiclusters and stochastic resonance. Europhys Lett 115:10005
Wojewoda J, Czolczynski K, Maistrenko Y, Kapitaniak T (2016) The smallest chimera state for coupled pendula. Sci Rep 6:34329
Premalatha K, Chandrasekar VK, Senthilvelan M, Lakshmanan M (2016) Imperfectly synchronized states and chimera states in two interacting populations of nonlocally coupled Stuart-Landau oscillators. Phys Rev E 94:012311
Maistrenko Y, Brezetsky S, Jaros P, Levchenko R, Kapitaniak T (2017) Smallest chimera states. Phys Rev E 95:010203(R)
Jaros P, Brezetsky S, Levchenko R, Dudkowski D, Kapitaniak T, Maistrenko Y (2018) Solitary states for coupled oscillators with inertia. Chaos 28:011103
Teichmann E, Rosenblum M (2019) Solitary states and partial synchrony in oscillatory ensembles with attractive and repulsive interactions. Chaos 29:093124
Taher H, Olmi S, Schöll E (2019) Enhancing power grid synchronization and stability through time delayed feedback control. Phys Rev E 100:062306
Ashwin P, Burylko O, Maistrenko Y (2008) Bifurcation to heteroclinic cycles and sensitivity in three and four coupled phase oscillators. Phys D 237:454
Golubitsky M, Stewart I (1988) Singularities and groups in bifurcation theory. Volume 2, Applied mathematical sciences, vol 69. Springer, New York
Maistrenko Y, Vasylenko A, Sudakov O, Levchenko R, Maistrenko VL (2014) Cascades of multi-headed chimera states for coupled phase oscillators. Int J Bifur Chaos 24:1440014
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
Copyright information
© 2021 The Author(s), under exclusive license to Springer Nature Switzerland AG
About this chapter
Cite this chapter
Berner, R. (2021). Adaptation on Nonlocally Coupled Ring Networks. In: Patterns of Synchrony in Complex Networks of Adaptively Coupled Oscillators. Springer Theses. Springer, Cham. https://doi.org/10.1007/978-3-030-74938-5_6
Download citation
DOI: https://doi.org/10.1007/978-3-030-74938-5_6
Published:
Publisher Name: Springer, Cham
Print ISBN: 978-3-030-74937-8
Online ISBN: 978-3-030-74938-5
eBook Packages: Physics and AstronomyPhysics and Astronomy (R0)