Control of the Compass-Gait Walker Using an Enhanced Poincaré Map and via LMI-Based Optimization

Wafa Znegui, H. Gritli, S. Belghith
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Abstract

In this paper, we introduce a control approach using a quadratic polynomial expression of the controlled Poincaré Map to actively stabilize the passive walking motion of the two-degree-of-freedom compass-gait biped walker. The passive gait cycle of the bipedal walker is depicted for a given fixed point. The control of the passive gaits involves firstly the reconstruction of the nonlinear complex dynamics describing the passive bipedal walking into an amendable linear system around the period-1 limit cycle. It involves secondly the determination of the quadratic polynomial expression of the nonlinear controlled Poincaré Map, and finally the identification of its period-1 fixed point. Successively, to stabilize such fixed point, we develop the linearized Poincaré Map, which will be explored to design the feedback gain of the control law. The control problem is cast then into a convex optimization involving a linear matrix inequality (LMI) by maximizing the bound on the nonlinear term in the Poincaré map. Simulation outputs illustrate the efficiency of the adopted LMI-based optimization method in the control of the passive motion of the compass-gait walker.
基于增强poincarcarcars图和lmi优化的圆规步行器控制
本文介绍了一种利用被控poincar映射的二次多项式表达式来主动稳定二自由度罗盘步态双足步行器的被动行走运动的控制方法。描述了给定固定点下双足步行器的被动步态周期。被动步态的控制首先涉及到将描述被动双足行走的非线性复杂动力学重构成一个绕周期-1极限环的可修正线性系统。其次确定非线性控制庞卡罗映射的二次多项式表达式,最后确定其周期为1的不动点。接着,为了稳定该不动点,我们建立了线性化的poincar映射,并探讨了控制律反馈增益的设计。然后将控制问题转化为涉及线性矩阵不等式(LMI)的凸优化问题,通过最大化庞卡罗映射中非线性项的界。仿真结果表明,所采用的基于lmi的优化方法在罗盘步态步行器被动运动控制中的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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