1) moving point
动点
1.
Selection of moving point and moving coordinate in composite motion of points;
点的合成运动中动点和动系的选择
2.
A Class of Inequality Involving a Moving Point inside Triangle;
涉及三角形内一动点的一类不等式
3.
It is expounded in the paper that the wording of the "Direct Choose"and"Reversed Choose" of the moving point and moving reference system is unscientific It is also illustrated that in the study of problems of kinematics of mechanism it is not proper to restrict the choice of moving point at the contact of two rigid bodie
论述了有关动点和动系的“正选”与“反选”的提法是不科学的 ,指出在研究有关的机构运动学问题时 ,把动点的选取局限在两刚体的接触点处是不妥当的。
3) mobile point
动点
1.
By using one of Klamkin s Inequalities,a weighed geometric inequality in triangle with related to a mobile point is given.
运用三角形惯性矩不等式,建立涉及三角形平面上一动点的一个加权几何不等式且导出若干新的不等式。
4) spot driving
点动
1.
This paper presented the objectoriented designing method to design hand pulser and spot driving function module.
提出了手轮和点动集成模块的全新设计方法面向对象设计 ,给出了面向对象的手轮和点动的实现框
5) point-to-point motion
点对点运动
1.
Third-order profile planning algorithm and implementation for high accuracy point-to-point motion;
超精密点对点运动3阶轨迹规划算法与实现
2.
We study a third-order trajectory planning algorithm for ultra-precision point-to-point motion and its accuracy compensation method.
研究了一种优化的超精密点对点运动3阶轨迹规划算法及其精度补偿方法。
3.
A novel algorithm of four-order profile planning for point-to-point motion and error compensation method were investigated.
研究了一种优化超精密点对点运动的4阶轨迹规划算法及其精度补偿方法。
6) starting point
起点起动点
补充资料:Borel不动点定理
Borel不动点定理
Borel fixed - point theorem
B吮l不动点定理{B.限l五xe小州nt价e僻m二匆卿,T侧邓吧,f.01”聊叉B“狱班滋n卜.王j 设F为代数闭域kl二非空完全代数簇,正则地作用于犷上的连通可解代数群G(见变换的代数群扭1罗-braic goup of transformat一ons))在卜中有不动点.由这个定理可以推出代数群的B.耽l子群(Borel sub-grouP)是共扼的(Bore卜MOI洲)叉)B定理(Borel一Moro-zov theorem)),不动点定理是A.Borel([lj)证明的.Borel定理可以推广到任意域k(不一定代数封闭卜设F为在域k上定义的完全簇若连通可解k分裂群(人一sPlit grouP)G正则地作用在F上,则有理人点集V(k)或者为空集,或者它包含G的一个不动点.因此推广的Bore]子群共扼性定理是:若域k是完满的,则一个连通人定义的代数群H的极大连通可解北可裂子群,在H的k点构成的群中元素作用下互相共辘(f21),
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条