DocumentCode
1843037
Title
Limit cycles and their stability in a passive bipedal gait
Author
Goswami, Ambarish ; Espiau, Bernard ; Keramane, A.
Author_Institution
Inst. Nat. de Recherche en Inf. et Autom., Grenoble, France
Volume
1
fYear
1996
fDate
22-28 Apr 1996
Firstpage
246
Abstract
It is well-known that a suitably designed unpowered mechanical biped robot can “walk” down an inclined plane with a steady gait. The characteristics of the gait (e.g., velocity, time period, step length) depend on the geometry and the inertial properties of the robot and the slope of the plane. A passive motion has the distinction of being “natural” and is likely to enjoy energy optimality. Investigation of such motions may potentially lead us to strategies useful for controlling active walking machines. In this paper we demonstrate that the nonlinear dynamics of a simple passive “compass gait” biped robot can exhibit periodic and stable limit cycle. Kinematically the robot is identical to a double pendulum (or its variations such as the Acrobot and the Pendubot). Simulation results also reveal the existence of a stable gait with unequal step lengths. We also present an active control scheme which enlarges the basin of attraction of the passive limit cycle
Keywords
legged locomotion; limit cycles; stability; Acrobot; Pendubot; active control scheme; active walking machines; attraction basin; double pendulum; energy optimality; nonlinear dynamics; passive bipedal gait; passive limit cycle; passive motion; periodic stable limit cycle; robot kinematics; simple passive compass gait biped robot; steady gait; step length; time period; unpowered mechanical biped robot; velocity; Computational geometry; Databases; Humans; Laboratories; Legged locomotion; Limit-cycles; Motion control; Prototypes; Robot kinematics; Stability;
fLanguage
English
Publisher
ieee
Conference_Titel
Robotics and Automation, 1996. Proceedings., 1996 IEEE International Conference on
Conference_Location
Minneapolis, MN
ISSN
1050-4729
Print_ISBN
0-7803-2988-0
Type
conf
DOI
10.1109/ROBOT.1996.503785
Filename
503785
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