Lag synchronization and scaling of chaotic attractor in coupled system.

We report a design of delay coupling for lag synchronization in two unidirectionally coupled chaotic oscillators. A delay term is introduced in the definition of the coupling to target any desired lag between the driver and the response. The stability of the lag synchronization is ensured by using the Hurwitz matrix stability. We are able to scale up or down the size of a driver attractor at a response system in presence of a lag. This allows compensating the attenuation of the amplitude of a signal during transmission through a delay line. The delay coupling is illustrated with numerical examples of 3D systems, the Hindmarsh-Rose neuron model, the Rössler system, a Sprott system, and a 4D system. We implemented the coupling in electronic circuit to realize any desired lag synchronization in chaotic oscillators and scaling of attractors.

[1]  Tae-Hee Lee,et al.  Adaptive Functional Projective Lag Synchronization of a Hyperchaotic Rössler System , 2009 .

[2]  Chin-Kun Hu,et al.  Effect of time delay on the onset of synchronization of the stochastic Kuramoto model , 2010, 1008.1198.

[3]  Naresh K. Sinha,et al.  Modern Control Systems , 1981, IEEE Transactions on Systems, Man, and Cybernetics.

[4]  J. Hindmarsh,et al.  A model of neuronal bursting using three coupled first order differential equations , 1984, Proceedings of the Royal Society of London. Series B. Biological Sciences.

[5]  E Mosekilde,et al.  Loss of lag synchronization in coupled chaotic systems. , 1999, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[6]  P. K. Roy,et al.  Experimental observation on the effect of coupling on different synchronization phenomena in coupled nonidentical Chua’s oscillators , 2003 .

[7]  P. K. Roy,et al.  Design of coupling for synchronization of chaotic oscillators. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.

[8]  S. Boccaletti,et al.  Synchronization of chaotic systems , 2001 .

[9]  Kestutis Pyragas,et al.  Coupling design for a long-term anticipating synchronization of chaos. , 2008, Physical review. E, Statistical, nonlinear, and soft matter physics.

[10]  J. Sprott,et al.  Some simple chaotic flows. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[11]  Transition between anticipating and lag synchronization in chaotic external-cavity laser diodes. , 2002 .

[12]  P. K. Roy,et al.  Engineering generalized synchronization in chaotic oscillators. , 2011, Chaos.

[13]  Ned J Corron,et al.  Time shifts and correlations in synchronized chaos. , 2008, Chaos.

[14]  J. Kurths,et al.  From Phase to Lag Synchronization in Coupled Chaotic Oscillators , 1997 .

[15]  Lu Qi-Shao,et al.  Time Delay-Enhanced Synchronization and Regularization in Two Coupled Chaotic Neurons , 2005 .

[16]  M. Lakshmanan,et al.  Transition from anticipatory to lag synchronization via complete synchronization in time-delay systems. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[17]  S. K. Dana,et al.  Antisynchronization of Two Complex Dynamical Networks , 2009, Complex.

[18]  R. E. Amritkar Estimating parameters of a nonlinear dynamical system. , 2009, Physical review. E, Statistical, nonlinear, and soft matter physics.