Braess's paradox in oscillator networks, desynchronization and power outage
暂无分享,去创建一个
[1] J. Rogers. Chaos , 1876, Molecular Vibrations.
[2] Yoshiki Kuramoto,et al. Chemical Oscillations, Waves, and Turbulence , 1984, Springer Series in Synergetics.
[3] Joel E. Cohen,et al. Paradoxical behaviour of mechanical and electrical networks , 1991, Nature.
[4] P. Gács,et al. Algorithms , 1992 .
[5] K. R. Padiyar,et al. Power system dynamics : stability and control , 1996 .
[6] Duncan J. Watts,et al. Collective dynamics of ‘small-world’ networks , 1998, Nature.
[7] S. Strogatz. From Kuramoto to Crawford: exploring the onset of synchronization in populations of coupled oscillators , 2000 .
[8] Jon M. Kleinberg,et al. Navigation in a small world , 2000, Nature.
[9] L. Glass. Synchronization and rhythmic processes in physiology , 2001, Nature.
[10] S. Strogatz. Exploring complex networks , 2001, Nature.
[11] Jürgen Kurths,et al. Synchronization: Phase locking and frequency entrainment , 2001 .
[12] Adilson E Motter,et al. Cascade-based attacks on complex networks. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.
[13] Stefano Bregni,et al. Synchronization of Digital Telecommunications Networks , 2002 .
[14] Tim Roughgarden,et al. How bad is selfish routing? , 2002, JACM.
[15] Réka Albert,et al. Structural vulnerability of the North American power grid. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.
[16] A. Vespignani,et al. The architecture of complex weighted networks. , 2003, Proceedings of the National Academy of Sciences of the United States of America.
[17] Edward Ott,et al. Theoretical mechanics: Crowd synchrony on the Millennium Bridge , 2005, Nature.
[18] Christian Hauptmann,et al. Effective desynchronization by nonlinear delayed feedback. , 2005, Physical review letters.
[19] R. Spigler,et al. The Kuramoto model: A simple paradigm for synchronization phenomena , 2005 .
[20] Anna Nagurney,et al. On a Paradox of Traffic Planning , 2005, Transp. Sci..
[21] Marc Timme,et al. Does Dynamics Reflect Topology in Directed Networks , 2006, cond-mat/0610186.
[22] Martin Greiner,et al. Proactive robustness control of heterogeneously loaded networks. , 2006, Physical review letters.
[23] A. Motter,et al. Synchronization is optimal in nondiagonalizable networks. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[24] M. Ilić,et al. A Quantitative Analysis of the Relationship Between Congestion and Reliability in Electric Power Networks , 2007 .
[25] Hiroshi Kori,et al. Engineering Complex Dynamical Structures: Sequential Patterns and Desynchronization , 2007, Science.
[26] G. Filatrella,et al. Analysis of a power grid using a Kuramoto-like model , 2007, 0705.1305.
[27] Michael T. Gastner,et al. Price of anarchy in transportation networks: efficiency and optimality control. , 2007, Physical review letters.
[28] Emma Marris,et al. Energy: Upgrading the grid , 2008, Nature.
[29] Mirko Schäfer,et al. Robustness of networks against fluctuation-induced cascading failures. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.
[30] Janusz Bialek,et al. Power System Dynamics: Stability and Control , 2008 .
[31] H. Jürgensen. Synchronization , 2021, Inf. Comput..
[32] Dirk Helbing,et al. Transient dynamics increasing network vulnerability to cascading failures. , 2007, Physical review letters.
[33] R. Rosenfeld. Nature , 2009, Otolaryngology--head and neck surgery : official journal of American Academy of Otolaryngology-Head and Neck Surgery.
[34] E. Ott,et al. Exact results for the Kuramoto model with a bimodal frequency distribution. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.
[35] Lubos Buzna,et al. Synchronization in symmetric bipolar population networks. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.
[36] H. Meyer-Ortmanns,et al. On the role of frustration in excitable systems. , 2010, Chaos.
[37] S. Havlin,et al. Interdependent networks: reducing the coupling strength leads to a change from a first to second order percolation transition. , 2010, Physical review letters.
[38] Harry Eugene Stanley,et al. Catastrophic cascade of failures in interdependent networks , 2009, Nature.
[39] Adilson E Motter,et al. Network synchronization landscape reveals compensatory structures, quantization, and the positive effect of negative interactions , 2009, Proceedings of the National Academy of Sciences.
[40] Sergey V. Buldyrev,et al. Critical effect of dependency groups on the function of networks , 2010, Proceedings of the National Academy of Sciences.
[41] Hans J. Herrmann,et al. Mitigation of malicious attacks on networks , 2011, Proceedings of the National Academy of Sciences.
[42] Marc Timme,et al. Self-organized adaptation of a simple neural circuit enables complex robot behaviour , 2010, ArXiv.
[43] Adilson E Motter,et al. Robustness of optimal synchronization in real networks. , 2011, Physical review letters.
[44] Marc Timme,et al. Self-organized synchronization in decentralized power grids. , 2012, Physical review letters.
[45] Hildegard Meyer-Ortmanns,et al. Stochastic description of a bistable frustrated unit , 2012 .
[46] Alessandro Vespignani. Modelling dynamical processes in complex socio-technical systems , 2011, Nature Physics.
[47] Yan Li,et al. Understanding and Control of Power Grids , 2012, Autonomous Systems: Developments and Trends.
[48] E. Ryabov,et al. Intramolecular vibrational redistribution: from high-resolution spectra to real-time dynamics , 2012 .