A passive-biped model with multiple routes to chaos 被引量：2

A passive-biped model with multiple routes to chaos

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摘要 This paper presents a new passive-biped model consisting of a simplest walking model beneath an upper body, with no kinematic constraint. The upper body is attached to the legs with a linear torsional spring. The model is a passive dynamic walker, so it walks down a slope without energy input. The governing equations of motion are derived and simulated for the parameter analysis purposes. Simulation results reveal some different routes to chaos that have not been observed in previous models. This paper presents a new passive-biped model consisting of a simplest walking model beneath an upper body, with no kinematic constraint. The upper body is attached to the legs with a linear torsional spring. The model is a passive dynamic walker, so it walks down a slope without energy input. The governing equations of motion are derived and simulated for the parameter analysis purposes. Simulation results reveal some different routes to chaos that have not been observed in previous models.

作者 F. Farshimi M. Naraghi

机构地区 Department of mechanical Engineering

出处《Acta Mechanica Sinica》 SCIE EI CAS CSCD 2011年第2期277-284,共8页 力学学报（英文版）

关键词 Passive-biped Routes to chaos Upper body BIFURCATION Passive-biped · Routes to chaos · Upper body · Bifurcation

分类号 O415.5 [理学—理论物理]

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参考文献9

1McGeer,T.Dynamics and control of bipedal locomotion. Journal of Theoretical Biology . 1993
2Tehrani Safa, A,Ghaffari Saadat, M,Naraghi, M.Passive dynamic of the simplest walking model: Replacing ramps with stairs. Mechanism and Machine Theory . 2007
3Wisse, M,Schwab, A.L,Vander Helm, F.C.T.Passive dynamic walking model with upper body. Robotica . 2004
4Gomes, M.W,Ruina, A.L.A walking model with no energy cost. http://ruina.tam.cornell. edu/research/topics/locomotion and robotics/ . 2004
5Kurz, M.J,Stergiou, N,Heidel, J. et al.A template for the exploration of chaotic locomotive patterns. Chaos Solitons Fractals . 2005
6Stillwell,J.Classical Topology and Combinatorial Group Theory. . 1993
7M Garcia,A Chatterjee,A Ruina,M Coleman.The simplest walking model: stability, complexity, and scaling. Journal of Biomechanical Engineering Transactions of the ASME . 1998
8Hilborn,RC. Chaos and nonlinear dynamics . 2000
9McGeer T.Passive dynamic walking. International Journal of Robotics Research . 1990

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2LI Q, YANG X S, CHEN S. Hyperchaos in a spacecraft power system[J]. International Journal of Bifurcation and Chaos, 2011,21:1719-1726.
3YANG X S. Horseshoe chaos in a simple memristive circuit [J]. International Journal of Bifurcation and Chaos, 2009,19: 1127 - 1145.
4LI Q, YANG X S. Topological horseshoe in a chaotic system with no equilibria[J]. International Journal of Bifurcation and Chaos, 2010, 20:467-478.
5LI C, YU S, LUO X. Theoretical design and circuit implementation of integer domain chaotic systems [J]. International Journal of Bifurcation and Chaos,2013, 23:1350170.
6LI J, LIU F, GUAN Z H. A new chaotic Hopfield neural network and its synthesis via parameter switchings [J]. Neurocomputing, 2013, 117 : 33 - 39.
7SRISUCHINWONG B, AMONCHAILERTRAT N. Realization of a lambert W function for a chaotic circuit [J]. Journal of Circuits, Systems and Computers, 2013 ,22: 1350075.
8LI Q, ZENG H, YANG X S. Simulation of the classical analog phase-locked loop based circuits[J]. Nonlinear Dynamics, 2014, 77 : 255 - 266.
9ZHOU P, YANG F. Hyperchaos chaos and horseshoe in a 4D nonlinear system with an infinite number of equilibrium points [J]. Nonlinear Dynamics, 2014,76 : 473 - 480.
10LI Q D, TANG S, YANG X S. Hyperchaotic set in continuous chaos-hyperchaos transition [J]. Communications in Nonlinear Science and Numerical Simulation, 2014,19 : 3718 - 3734.

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Acta Mechanica Sinica

2011年第2期

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A passive-biped model with multiple routes to chaos 被引量：2

参考文献9

同被引文献33

引证文献2

二级引证文献7

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