Amplitude death in nonlinear oscillators with mixed time-delayed coupling.
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J. Kurths | Yangxin Tang | W. Zou | D. Senthilkumar | Jianquan Lu | Ye Wu | yangxin Tang
[1] Thilo Gross,et al. Amplitude death in networks of delay-coupled delay oscillators , 2012, Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences.
[2] Garima Saxena,et al. Amplitude death: The emergence of stationarity in coupled nonlinear systems , 2012, 1209.6355.
[3] J. Kurths,et al. Stabilizing oscillation death by multicomponent coupling with mismatched delays. , 2012, Physical review. E, Statistical, nonlinear, and soft matter physics.
[4] J. Kurths,et al. Identifying Controlling Nodes in Neuronal Networks in Different Scales , 2012, PloS one.
[5] M. Shrimali,et al. Amplitude death with mean-field diffusion. , 2012, Physical review. E, Statistical, nonlinear, and soft matter physics.
[6] Jürgen Kurths,et al. Oscillation death in asymmetrically delay-coupled oscillators. , 2012, Physical review. E, Statistical, nonlinear, and soft matter physics.
[7] R. E. Amritkar,et al. Amplitude death in complex networks induced by environment. , 2012, Physical review. E, Statistical, nonlinear, and soft matter physics.
[8] W. Marsden. I and J , 2012 .
[9] J. Kurths,et al. Control of delay-induced oscillation death by coupling phase in coupled oscillators. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.
[10] Xiaoming Zhang,et al. Analytical Conditions for Amplitude Death Induced by Conjugate Variable Couplings , 2011, Int. J. Bifurc. Chaos.
[11] E. Schöll,et al. Amplitude death in systems of coupled oscillators with distributed-delay coupling , 2011, 1202.0226.
[12] Meng Zhan,et al. Insensitive dependence of delay-induced oscillation death on complex networks. , 2011, Chaos.
[13] Yongli Song,et al. Bifurcation, amplitude death and oscillation patterns in a system of three coupled van der Pol oscillators with diffusively delayed velocity coupling. , 2011, Chaos.
[14] Keiji Konishi,et al. Topology-free stability of a steady state in network systems with dynamic connections. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.
[15] R. E. Amritkar,et al. General mechanism for amplitude death in coupled systems. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.
[16] D. V. Senthilkumar,et al. Dynamics of Nonlinear Time-Delay Systems , 2011 .
[17] W. Zou,et al. Eliminating delay-induced oscillation death by gradient coupling. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.
[18] Ramakrishna Ramaswamy,et al. Dynamical effects of integrative time-delay coupling. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.
[19] Shuguang Guan,et al. Characterizing generalized synchronization in complex networks , 2010 .
[20] J. Kurths,et al. Parameter mismatches and oscillation death in coupled oscillators. , 2010, Chaos.
[21] Ramakrishna Ramaswamy,et al. Amplitude death in nonlinear oscillators with nonlinear coupling. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.
[22] V Flunkert,et al. Delay stabilization of periodic orbits in coupled oscillator systems , 2010, Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences.
[23] Keiji Konishi,et al. Stability analysis and design of amplitude death induced by a time-varying delay connection , 2010 .
[24] Keiji Konishi,et al. Stabilization of a steady state in network oscillators by using diffusive connections with two long time delays. , 2010, Physical review. E, Statistical, nonlinear, and soft matter physics.
[25] Meng Zhan,et al. Partial time-delay coupling enlarges death island of coupled oscillators. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.
[26] Meng Zhan,et al. Oscillation death in coupled oscillators , 2009 .
[27] Shuguang Guan,et al. Transition to amplitude death in scale-free networks , 2008, 0812.4374.
[28] J. Kurths,et al. Detuning-dependent dominance of oscillation death in globally coupled synthetic genetic oscillators , 2009 .
[29] Keiji Konishi,et al. Amplitude death in time-delay nonlinear oscillators coupled by diffusive connections. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.
[30] S. Strogatz,et al. Solvable model for chimera states of coupled oscillators. , 2008, Physical review letters.
[31] Jurgen Kurths,et al. Synchronization in complex networks , 2008, 0805.2976.
[32] Alexei Zaikin,et al. Multistability and clustering in a population of synthetic genetic oscillators via phase-repulsive cell-to-cell communication. , 2007, Physical review letters.
[33] Eckehard Schöll,et al. Handbook of Chaos Control , 2007 .
[34] Awadhesh Prasad,et al. Amplitude death in the absence of time delays in identical coupled oscillators. , 2007, Physical review. E, Statistical, nonlinear, and soft matter physics.
[35] Jau Ching Lun,et al. Amplitude death in coupled chaotic solid-state lasers with cavity-configuration-dependent instabilities , 2007 .
[36] Philipp Hövel,et al. Control of unstable steady states by extended time-delayed feedback. , 2007, Physical review. E, Statistical, nonlinear, and soft matter physics.
[37] Keiji Konishi,et al. Amplitude Death Induced by a Global Dynamic Coupling , 2007, Int. J. Bifurc. Chaos.
[38] Yuan Yuan,et al. Stability Switches and Hopf Bifurcations in a Pair of Delay-Coupled Oscillators , 2007, J. Nonlinear Sci..
[39] Eckehard Schöll,et al. Some basic remarks on eigenmode expansions of time-delay dynamics , 2007 .
[40] Ramakrishna Ramaswamy,et al. Phase-flip bifurcation induced by time delay. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[41] Philipp Hövel,et al. Control of unstable steady states by long delay feedback. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[42] Abhijit Sen,et al. Death island boundaries for delay-coupled oscillator chains , 2006 .
[43] C. Mirasso,et al. Synchronization properties of two self-oscillating semiconductor lasers subject to delayed optoelectronic mutual coupling. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.
[44] Monika Sharma,et al. Chemical oscillations , 2006 .
[45] Fatihcan M. Atay,et al. Oscillator death in coupled functional differential equations near Hopf bifurcation , 2006 .
[46] Awadhesh Prasad,et al. Amplitude death in coupled chaotic oscillators. , 2005, Physical review. E, Statistical, nonlinear, and soft matter physics.
[47] E Schöll,et al. Delayed feedback control of chaos: bifurcation analysis. , 2005, Physical review. E, Statistical, nonlinear, and soft matter physics.
[48] K. Konishi. Amplitude death in oscillators coupled by a one-way ring time-delay connection. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.
[49] I Ozden,et al. Strong coupling of nonlinear electronic and biological oscillators: reaching the "amplitude death" regime. , 2004, Physical review letters.
[50] S. Strogatz,et al. Chimera states for coupled oscillators. , 2004, Physical review letters.
[51] Ramana Dodla,et al. Phase-locked patterns and amplitude death in a ring of delay-coupled limit cycle oscillators. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.
[52] Keiji Konishi,et al. Amplitude death induced by dynamic coupling. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.
[53] Y. Lai,et al. Amplitude modulation in a pair of time-delay coupled external-cavity semiconductor lasers , 2003 .
[54] F. Atay. Distributed delays facilitate amplitude death of coupled oscillators. , 2003, Physical review letters.
[55] A. Pikovsky,et al. Synchronization: Theory and Application , 2003 .
[56] Jürgen Kurths,et al. Synchronization - A Universal Concept in Nonlinear Sciences , 2001, Cambridge Nonlinear Science Series.
[57] Sen,et al. Experimental evidence of time-delay-induced death in coupled limit-cycle oscillators , 1998, Physical review letters.
[58] D. V. Reddy,et al. Time delay effects on coupled limit cycle oscillators at Hopf bifurcation , 1998, chao-dyn/9810023.
[59] Steven H. Strogatz,et al. Nonlinear dynamics: Death by delay , 1998, Nature.
[60] Epstein,et al. Coupled chaotic chemical oscillators. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.
[61] S. Strogatz,et al. Amplitude death in an array of limit-cycle oscillators , 1990 .
[62] G. Ermentrout,et al. Amplitude response of coupled oscillators , 1990 .
[63] Michael F. Crowley,et al. Experimental and theoretical studies of a coupled chemical oscillator: phase death, multistability, and in-phase and out-of-phase entrainment , 1989 .
[64] Smith,et al. Phase locking of relativistic magnetrons. , 1989, Physical review letters.
[65] K. Bar-Eli,et al. On the stability of coupled chemical oscillators , 1985 .
[66] Yoshiki Kuramoto,et al. Chemical Oscillations, Waves, and Turbulence , 1984, Springer Series in Synergetics.
[67] A. Winfree. The geometry of biological time , 1991 .
[68] J. Hale. Functional Differential Equations , 1971 .