Title :
Bifurcation and chaos in a simple passive bipedal gait
Author :
Thuilot, Benoit ; Goswami, Ambarish ; Espiau, Bernard
Author_Institution :
Inst. Nat. de Recherche en Inf. et Autom., Montbonnot Saint Martin, France
Abstract :
This paper proposes an analysis of the behavior of perhaps the simplest biped robot: the compass gait model. It has been shown previously that such a robot can walk down a slope indefinitely without any actuation. Passive motions of this nature are of particular interest since they may lead us to strategies for controlling active walking machines as well as to a better understanding of human locomotion. We show here that, depending on the parameters of the system, passive compass gait may exhibit 1-periodic, 2n-periodic and chaotic gaits proceeding from cascades of period-doubling bifurcations. Since compass equations are quite involved (they combine nonlinear differential and algebraic equations in a 4-dimensional space), our investigations rely, in part, on numerical simulations
Keywords :
bifurcation; chaos; legged locomotion; mobile robots; robot dynamics; 1-periodic gait; 2n-periodic gait; 4D space; active walking machines; algebraic equations; bifurcation; chaos; chaotic gait; compass gait model; human locomotion; nonlinear differential equations; passive motions; period-doubling bifurcation cascades; simple passive bipedal gait; Anthropomorphism; Bifurcation; Chaos; Differential algebraic equations; Humans; Laboratories; Legged locomotion; Nonlinear equations; Numerical simulation; Robots;
Conference_Titel :
Robotics and Automation, 1997. Proceedings., 1997 IEEE International Conference on
Conference_Location :
Albuquerque, NM
Print_ISBN :
0-7803-3612-7
DOI :
10.1109/ROBOT.1997.620131
