New Canards Bursting and Canards Periodic-Chaotic Sequence

doi:10.1088/0256-307X/26/7/070504

Chin. Phys. Lett.

2009, Vol. 26

Issue (7): 070504 DOI: 10.1088/0256-307X/26/7/070504

GENERAL

New Canards Bursting and Canards Periodic-Chaotic Sequence

YOOER Chi-Feng, XU Jian-Xue, ZHANG Xin-Hua

Institute of Nonlinear Dynamics, Xi'an Jiaotong University, Xi'an 710049

Cite this article:

YOOER Chi-Feng, XU Jian-Xue, ZHANG Xin-Hua 2009 Chin. Phys. Lett. 26 070504

Download: PDF(290KB)
Export: BibTeX | EndNote | Reference Manager | ProCite | RefWorks

Abstract A trajectory following the repelling branch of an equilibrium or a periodic orbit is called a canards solution. Using a continuation method, we find a new type of canards bursting which manifests itself in an alternation between the oscillation phase following attracting the limit cycle branch and resting phase following a repelling fixed point branch in a reduced leech neuron model. Via periodic-chaotic alternating of infinite times, the number of windings within a canards bursting can approach infinity at a Gavrilov-Shilnikov homoclinic tangency bifurcation of a simple saddle limit cycle

Keywords: 05.45.Gg 05.45.Pq 07.05.Mh

Received: 03 March 2009 Published: 02 July 2009

PACS:	05.45.Gg	(Control of chaos, applications of chaos)
	05.45.Pq	(Numerical simulations of chaotic systems)
	07.05.Mh	(Neural networks, fuzzy logic, artificial intelligence)

TRENDMD:

URL:

https://cpl.iphy.ac.cn/10.1088/0256-307X/26/7/070504 OR https://cpl.iphy.ac.cn/Y2009/V26/I7/070504

Service
	E-mail this article
	E-mail Alert
	RSS
Articles by authors
	YOOER Chi-Feng
	XU Jian-Xue
	ZHANG Xin-Hua

[1] Coombes S and Bressloff P C 2005 Bursting: TheGenesis of Rhythm in the Nervous System (Singapore: WorldScientific)
[2] Ren W, Hu S, Zhang B, Wang F, Gong Y and Xu J 1997 Int. J. Bifurcat. Chaos 7 1867
[3] Holden A V and Fan Y 1992 Chaos Soliton. Fract. 2 221
[4] Terman D 1991 SIAM J. Appl. Math. 51 1418
[5] Kramer M A, Traub R D and Kopell N 2008 Phys. Rev.Lett. 101 068103
[6] Cymbalyuk G S, Gaudry Q, Masino M A and Calabrese R L 2002 J. Neurosci. 22 24
[7] Hill A, Lu J, Masino M, Olsen O and Calabrese R L 2001 J. Comput. Neurosci. 10 281
[8] Cymbalyuk G S and Calabrese R L 2001 Neurocomputing 38 159
[9] Rinzel J 1985 Lect. Notes Math. 1151 304
[10] Izhikevich E M 2000 Int. J. Bifurcat. Chaos 10 1171
[11] Yooer C, Xu J and Zhang X 2009 Chin. Phys. Lett. 26 080501
[12] Afraimovich V and Shilnikov L P 1974 Sov. Math.Dokl. 15 1761
[13] Turaev D V and Shilnikov L P 1987 Sov. Math. Dokl. 34 397
[14] Shilnikov L P, Shilnikov A L, Turaev D V and Chua L 2001 Methods of Qualitative Theory in Nonlinear Dynamics(Singapore: World Scientific) p 2
[15] Doedel E J 2007 AUTO-07P: Continuation andBifurcation Software for Ordinary Differential Equations
[16] Gavrilov N K and Shilnikov L P 1972 Math. USSR-Sb 17 467
[17] Gavrilov N K and Shilnikov L P 1973 Math. USSR-Sb 19 139
[18] Gray C M, Konig P, Engel A K and Singer W 1989 Nature 338 334
[19] Groessberg S and Somers D 1991 Neural Netw. 4453

Related articles from Frontiers Journals

[1]	Salman Ahmad, YUE Bao-Zeng. Bifurcation and Stability Analysis of the Hamiltonian–Casimir Model of Liquid Sloshing[J]. Chin. Phys. Lett., 2012, 29(6): 070504
[2]	Paulo C. Rech. Dynamics in the Parameter Space of a Neuron Model[J]. Chin. Phys. Lett., 2012, 29(6): 070504
[3]	LI Jian-Ping,YU Lian-Chun,YU Mei-Chen,CHEN Yong. Zero-Lag Synchronization in Spatiotemporal Chaotic Systems with Long Range Delay Couplings**[J]. Chin. Phys. Lett., 2012, 29(5): 070504
[4]	ZHENG Yong-Ai. Adaptive Generalized Projective Synchronization of Takagi-Sugeno Fuzzy Drive-response Dynamical Networks with Time Delay[J]. Chin. Phys. Lett., 2012, 29(2): 070504
[5]	LI Xian-Feng, Andrew Y. -T. Leung, CHU Yan-Dong. Symmetry and Period-Adding Windows in a Modified Optical Injection Semiconductor Laser Model**[J]. Chin. Phys. Lett., 2012, 29(1): 070504
[6]	JI Ying, BI Qin-Sheng . SubHopf/Fold-Cycle Bursting in the Hindmarsh–Rose Neuronal Model with Periodic Stimulation**[J]. Chin. Phys. Lett., 2011, 28(9): 070504
[7]	KADIR Abdurahman, WANG Xing-Yuan, ZHAO Yu-Zhang . Generalized Synchronization of Diverse Structure Chaotic Systems**[J]. Chin. Phys. Lett., 2011, 28(9): 070504
[8]	WANG Xing-Yuan, QIN Xue, XIE Yi-Xin . Pseudo-Random Sequences Generated by a Class of One-Dimensional Smooth Map**[J]. Chin. Phys. Lett., 2011, 28(8): 070504
[9]	Department of Physics, Eastern Mediterranean University, G. Magosa, N. Cyprus, Mersin 0, Turkey . Chaos in Kundt Type-III Spacetimes[J]. Chin. Phys. Lett., 2011, 28(7): 070504
[10]	WANG Xing-Yuan, REN Xiao-Li . Chaotic Synchronization of Two Electrical Coupled Neurons with Unknown Parameters Based on Adaptive Control**[J]. Chin. Phys. Lett., 2011, 28(5): 070504
[11]	GUO Rong-Wei . Simultaneous Synchronization and Anti-Synchronization of Two Identical New 4D Chaotic Systems[J]. Chin. Phys. Lett., 2011, 28(4): 070504
[12]	SHI Si-Hong, YUAN Yong, WANG Hui-Qi, LUO Mao-Kang . Weak Signal Frequency Detection Method Based on Generalized Duffing Oscillator**[J]. Chin. Phys. Lett., 2011, 28(4): 070504
[13]	JIANG Nan, CHEN Shi-Jian . Chaos Control in Random Boolean Networks by Reducing Mean Damage Percolation Rate**[J]. Chin. Phys. Lett., 2011, 28(4): 070504
[14]	LI Qun-Hong, CHEN Yu-Ming, QIN Zhi-Ying . Existence of Stick-Slip Periodic Solutions in a Dry Friction Oscillator**[J]. Chin. Phys. Lett., 2011, 28(3): 070504
[15]	YANG Yang, WANG Cang-Long, DUAN Wen-Shan, CHEN Jian-Min . Resonance and Rectification in a Two-Dimensional Frenkel–Kontorova Model with Triangular Symmetry**[J]. Chin. Phys. Lett., 2011, 28(3): 070504

Viewed

Full text

Abstract