摘要
奇异性问题在用关节联接的机器人操作器的控制中是一个固有的问题.本文中.我们从考虑关节运动的精确性和可行性出发来确定操作器末端器所需运动时的关节运动.这种确定关节运动的方法称为具有奇异鲁棒逆的逆运动学解.之所以说它具有鲁棒性,是因为它在奇异点也能提供连续解.即使雅可比矩阵的逆或广义逆表示的道运动学解在奇异点或其周围不可行时,雅可比矩阵的奇异鲁棒逆也能为操作器末端器提供一个期望坐标轨迹的近似运动.对奇异鲁棒逆的特性与广义逆的特性进行了比较.并考虑了可行性的标量加权值.
The singularity problem is inherent in controlling articulated robot manipulators. In this paper, we de-termine the required joint motion of the end effectors by evaluating their accuracy and feasibility. The ro-bust inversion of singularity of the Jacobian matrix provides a motion approaching to the desired cartesiantrajectory at or in the neighborhood of singular points for the end effector, even when the inversekinematic solution represented by Jacobian matric inversion or pscudo inversion is infeasible.
出处
《机器人》
EI
CSCD
北大核心
1991年第2期10-17,共8页
Robot
关键词
机器人
操作器
奇异性
鲁棒性
逆
singularity
robustness
Jacobian matrix
end effector
robot manipulator
