Generalized synchronization of chaos in noninvertible maps.

The properties of functional relation between a noninvertible chaotic drive and a response map in the regime of generalized synchronization of chaos are studied. It is shown that despite a very fuzzy image of the relation between the current states of the maps, the functional relation becomes apparent when a sufficient interval of driving trajectory is taken into account. This paper develops a theoretical framework of such functional relation and illustrates the main theoretical conclusions using numerical simulations.

[1]  B. Kitchens Symbolic Dynamics: One-sided, Two-sided and Countable State Markov Shifts , 1997 .

[2]  Nikolai F. Rulkov,et al.  Images of synchronized chaos: Experiments with circuits. , 1996, Chaos.

[3]  M. A. Miller Nonuniqueness of inverse problems in macroelectrodynamics. Spherical and toroidal sources of electromagnetic fields (review) , 1986 .

[4]  J. Stark Invariant graphs for forced systems , 1997 .

[5]  J. Kurths,et al.  Phase synchronization of chaotic oscillations in terms of periodic orbits. , 1997, Chaos.

[6]  Balth. van der Pol,et al.  VII. Forced oscillations in a circuit with non-linear resistance. (Reception with reactive triode) , 1927 .

[7]  Carroll,et al.  Synchronization in chaotic systems. , 1990, Physical review letters.

[8]  Parlitz,et al.  Generalized synchronization, predictability, and equivalence of unidirectionally coupled dynamical systems. , 1996, Physical review letters.

[9]  Steven J Schiff,et al.  Limits to the experimental detection of nonlinear synchrony. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.

[10]  V. Arnold Mathematical Methods of Classical Mechanics , 1974 .

[11]  David A. Rand,et al.  Bifurcations of the forced van der Pol oscillator , 1978 .

[12]  Bruce J. Gluckman,et al.  The breakdown of Synchronization in Systems of Nonidentical Chaotic oscillators: Theory and Experiment , 2001, Int. J. Bifurc. Chaos.

[13]  J. Stark Regularity of invariant graphs for forced systems , 1999, Ergodic Theory and Dynamical Systems.

[14]  Valentin Afraimovich,et al.  Synchronization in directionally coupled systems: Some rigorous results , 2001 .

[15]  M. Rabinovich,et al.  Stochastic synchronization of oscillation in dissipative systems , 1986 .

[16]  Pyragas,et al.  Weak and strong synchronization of chaos. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[17]  H. Abarbanel,et al.  Generalized synchronization of chaos: The auxiliary system approach. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[18]  J. Yorke,et al.  Differentiable generalized synchronization of chaos , 1997 .

[19]  H. Fujisaka,et al.  Stability Theory of Synchronized Motion in Coupled-Oscillator Systems , 1983 .

[20]  Jürgen Kurths,et al.  Phase Synchronization in Regular and Chaotic Systems , 2000, Int. J. Bifurc. Chaos.

[21]  Krešimir Josić,et al.  Synchronization of chaotic systems and invariant manifolds , 2000 .

[22]  L. Tsimring,et al.  Generalized synchronization of chaos in directionally coupled chaotic systems. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[23]  Carroll,et al.  Statistics for mathematical properties of maps between time series embeddings. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[24]  Krešimir Josić,et al.  INVARIANT MANIFOLDS AND SYNCHRONIZATION OF COUPLED DYNAMICAL SYSTEMS , 1998 .

[25]  Albert Libchaber,et al.  Quasi-Periodicity and Dynamical Systems: An Experimentalist's View , 1988 .

[26]  Ulrich Parlitz,et al.  BIFURCATION STRUCTURE OF THE DRIVEN VAN DER POL OSCILLATOR , 1993 .

[27]  Jürgen Kurths,et al.  Alternating Locking Ratios in Imperfect Phase Synchronization , 1999 .