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M. Krupa, (1997), Robust Heteroclinic Cycles. Journal of Nonlinear Science, 7, pp. 129–176.KrupaM.1997Robust Heteroclinic Cycles7129176Search in Google Scholar
H. Kori and Y. Kuramoto, (2001), Slow Switching in Globally Coupled Oscillators: Robustness and Occurrence through Delayed Coupling. Physical Review E, 63, p. 046214.KoriH.KuramotoY.2001Slow Switching in Globally Coupled Oscillators: Robustness and Occurrence through Delayed Coupling63046214Search in Google Scholar
J. Wordsworth and P. Ashwin, (2008), Spatiotemporal Coding of Inputs for a System of Globally Coupled Phase Oscillators. Physical Review E, 78, p. 066203.WordsworthJ.AshwinP.2008Spatiotemporal Coding of Inputs for a System of Globally Coupled Phase Oscillators78066203Search in Google Scholar
F. Schittler Neves and M. Timme, (2012), Computation by Switching in Complex Networks of States. Physical Review Letters, 109, p. 018701.Schittler NevesF.TimmeM.2012Computation by Switching in Complex Networks of States109018701Search in Google Scholar
V. Afraimovich, I. Tristan, R. Huerta, and M. I. Rabinovich, (2008), Winnerless Competition Principle and Prediction of the Transient Dynamics in a Lotka–Volterra Model. Chaos: An Interdisciplinary Journal of Nonlinear Science, 18, p. 043103.AfraimovichV.TristanI.HuertaR.RabinovichM. I.2008Winnerless Competition Principle and Prediction of the Transient Dynamics in a Lotka–Volterra Model18043103Search in Google Scholar
C. Hauert and G. Szabø, (2005), Game Theory and Physics. American Journal of Physics, 73, pp. 405–414.HauertC.SzabøG.2005Game Theory and Physics73405414Search in Google Scholar
G. Szabó, J. Vukov, and A. Szolnoki, (2005), Phase Diagrams for an Evolutionary Prisoner’s Dilemma Game on Two-Dimensional Lattices. Physical Review E, 72, p. 047107.SzabóG.VukovJ.SzolnokiA.2005Phase Diagrams for an Evolutionary Prisoner’s Dilemma Game on Two-Dimensional Lattices72047107Search in Google Scholar
M. A. Nowak and K. Sigmund, (2002), Biodiversity: Bacterial Game Dynamics. Nature, 418, pp. 138–139.NowakM. A.SigmundK.2002Biodiversity: Bacterial Game Dynamics418138139Search in Google Scholar
M. I. Rabinovich, V. S. Afraimovich, and P. Varona, (2010), Heteroclinic Binding. Dynamical Systems, 25, pp. 433–442.RabinovichM. I.AfraimovichV. S.VaronaP.2010Heteroclinic Binding25433442Search in Google Scholar
M. I. Rabinovich, P. Varona, I. Tristan, and V. S. Afraimovich, (2014), Chunking Dynamics: Heteroclinics in Mind. Frontiers in Computational Neuroscience, 8, p. 00022.RabinovichM. I.VaronaP.TristanI.AfraimovichV. S.2014Chunking Dynamics: Heteroclinics in Mind800022Search in Google Scholar
M. I. Rabinovich, R. Huerta, and P. Varona, (2006), Heteroclinic Synchronization: Ultrasubharmonic Locking. Physical Review Letters, 96, p. 014101.RabinovichM. I.HuertaR.VaronaP.2006Heteroclinic Synchronization: Ultrasubharmonic Locking96014101Search in Google Scholar
M. I. Rabinovich, R. Huerta, P. Varona, and V. S. Afraimovich, (2008), Transient Cognitive Dynamics, Metastability, and Decision Making. PLoS Computational Biology, 4, p. e1000072.RabinovichM. I.HuertaR.VaronaP.AfraimovichV. S.2008Transient Cognitive Dynamics, Metastability, and Decision Making4e1000072Search in Google Scholar
M. A. Komarov, G. V. Osipov, J. A. K. Suykens, and M. I. Rabinovich, (2009), Numerical Studies of Slow Rhythms Emergence in Neural Microcircuits: Bifurcations and Stability. Chaos: An Interdisciplinary Journal of Nonlinear Science, 19, p. 015107.KomarovM. A.OsipovG. V.SuykensJ. A. K.RabinovichM. I.2009Numerical Studies of Slow Rhythms Emergence in Neural Microcircuits: Bifurcations and Stability19015107Search in Google Scholar
A. Szücs, R. Huerta, M. I. Rabinovich, and A. I. Selverston, (2009), Robust Microcircuit Synchronization by Inhibitory Connections. Neuron, 61, pp. 439–453.SzücsA.HuertaR.RabinovichM. I.SelverstonA. I.2009Robust Microcircuit Synchronization by Inhibitory Connections61439453Search in Google Scholar
M. A. Komarov, G. V. Osipov, and J. A. K. Suykens, (2009), Sequentially Activated Groups in Neural Networks. EPL (Europhysics Letters), 86, p. 60006.KomarovM. A.OsipovG. V.SuykensJ. A. K.2009Sequentially Activated Groups in Neural Networks8660006Search in Google Scholar
M. A. Komarov, G. V. Osipov, and J. A. K. Suykens, (2010), Metastable States and Transient Activity in Ensembles of Excitatory and Inhibitory Elements. EPL (Europhysics Letters), 91, p. 20006.KomarovM. A.OsipovG. V.SuykensJ. A. K.2010Metastable States and Transient Activity in Ensembles of Excitatory and Inhibitory Elements9120006Search in Google Scholar
V. S. Afraimovich, M. I. Rabinovich, and P. Varona, (2004), Heteroclinic Contours in Neural Ensembles and the Winnerless Competition Principle. International Journal of Bifurcation and Chaos, 14, pp. 1195–1208.AfraimovichV. S.RabinovichM. I.VaronaP.2004Heteroclinic Contours in Neural Ensembles and the Winnerless Competition Principle1411951208Search in Google Scholar
M. Voit and H. Meyer-Ortmanns, (2018), A Hierarchical Heteroclinic Network: Controlling the Time Evolution along Its Paths. Eur. Phys. J. Spec. Top., 227, pp. 1101–1115.VoitM.Meyer-OrtmannsH.2019A Hierarchical Heteroclinic Network: Controlling the Time Evolution along Its Paths22711011115Search in Google Scholar
V. Kirk and M. Silber, (1994), A Competition between Heteroclinic Cycles. Nonlinearity, 7, pp. 1605–1621.KirkV.SilberM.1994A Competition between Heteroclinic Cycles716051621Search in Google Scholar
S. Castro and A. Lohse, (2016), Switching in Heteroclinic Networks. SIAM Journal on Applied Dynamical Systems, 15, pp. 1085–1103.CastroS.LohseA.2016Switching in Heteroclinic Networks1510851103Search in Google Scholar
T.-L. Tsai and J. H. Dawes, (2013), Dynamics near a Periodically-Perturbed Robust Heteroclinic Cycle. Phys. Nonlinear Phenom., 262, pp. 14–34.TsaiT.-L.DawesJ. H.2013Dynamics near a Periodically-Perturbed Robust Heteroclinic Cycle2621434Search in Google Scholar