Collapse of mixed-mode oscillations and chaos in the extended Bonhoeffer-van Der pol oscillator under weak periodic perturbation

Mixed-mode oscillations in a slow-fast dynamical system under weak perturbation are studied numerically. First, we make a band-limited extremely weak Gaussian noise, and apply this noise to this oscillator. Then, we observe random phenomenon from numerical study even if the noise is extremely weak. The mixed-mode oscillations are submerged by chaos due to extremely weak noise. We imagine that mixed-mode oscillations in a slow-fast systems are delicate to the noise. In order to make clear the mechanism of generation of chaos, we assume that weak perturbation is periodic. From this assumption, we can calculate Lyapunov exponent, and draw a bifurcation diagram. In this bifurcation diagram, period-doubling bifurcations take place when the amplitude of the periodic perturbation is extremely small. We suspect the observability of the mixed-mode oscillation of the slow-fast dynamical system by experiment from this numerical result.

[1]  Joseph W. Durham,et al.  Feedback control of canards. , 2008, Chaos.

[2]  John Guckenheimer,et al.  Numerical Computation of Canards , 2000, Int. J. Bifurc. Chaos.

[3]  Helwig Löffelmann,et al.  GEOMETRY OF MIXED-MODE OSCILLATIONS IN THE 3-D AUTOCATALATOR , 1998 .

[4]  Shinji Doi,et al.  Noise-induced slow spiking and ISI variability in a simple neuronal model , 2007 .

[5]  A. Zvonkin,et al.  Non-standard analysis and singular perturbations of ordinary differential equations , 1984 .

[6]  M. Itoh,et al.  Experimental study of the missing solutions Canards , 1990 .

[7]  Marc Diener,et al.  The canard unchainedor how fast/slow dynamical systems bifurcate , 1984 .

[8]  R. W. Rollins,et al.  Mixed-mode oscillations in the electrodissolution of copper in acetic acid/acetate buffer , 1994 .

[9]  Takashi Hikihara,et al.  Period-doubling cascades of canards from the extended Bonhoeffer–van der Pol oscillator , 2010 .

[10]  I. Shimada,et al.  A Numerical Approach to Ergodic Problem of Dissipative Dynamical Systems , 1979 .

[11]  M. Koper Bifurcations of mixed-mode oscillations in a three-variable autonomous Van der Pol-Duffing model with a cross-shaped phase diagram , 1995 .

[12]  Georgi Medvedev,et al.  Multimodal oscillations in systems with strong contraction , 2007 .

[13]  Colin Sparrow,et al.  Local and global behavior near homoclinic orbits , 1984 .

[14]  V. Arnold,et al.  Dynamical Systems VII , 1994 .

[15]  Nancy Kopell,et al.  Mixed-Mode Oscillations in Three Time-Scale Systems: A Prototypical Example , 2008, SIAM J. Appl. Dyn. Syst..

[16]  J. L. Hudson,et al.  An experimental study of multiple peak periodic and nonperiodic oscillations in the Belousov–Zhabotinskii reaction , 1979 .

[17]  Kazuyuki Aihara,et al.  A pulse‐type hardware bursting neuron model , 2001 .

[18]  Martin Krupa,et al.  Mixed Mode Oscillations due to the Generalized Canard Phenomenon , 2006 .

[19]  Hiroshi Kawakami,et al.  Bifurcation of periodic responses in forced dynamic nonlinear circuits: Computation of bifurcation values of the system parameters , 1984 .

[20]  Valery Petrov,et al.  Mixed‐mode oscillations in chemical systems , 1992 .

[21]  A. Robinson Non-standard analysis , 1966 .