大连理工大学学报
大連理工大學學報
대련리공대학학보
JOURNAL OF DALIAN UNIVERSITY OF TECHNOLOGY
2001年
2期
149-151
,共3页
模型问题%约束/多体系统
模型問題%約束/多體繫統
모형문제%약속/다체계통
在建立多体系统动力学模型过程中,根据系统广义坐标的取值范围可以给出位移矢量的合理近似,但按照近似位移求得的速度和加速度却往往没有合理的精度,从而造成系统动力学模型的误差.利用约束的力学性质将系统位移所在的空间分解为互相正交的子空间,通过研究系统速度和加速度在这两个子空间的性质,提出了修正系统动力学模型的有效方法.
在建立多體繫統動力學模型過程中,根據繫統廣義坐標的取值範圍可以給齣位移矢量的閤理近似,但按照近似位移求得的速度和加速度卻往往沒有閤理的精度,從而造成繫統動力學模型的誤差.利用約束的力學性質將繫統位移所在的空間分解為互相正交的子空間,通過研究繫統速度和加速度在這兩箇子空間的性質,提齣瞭脩正繫統動力學模型的有效方法.
재건립다체계통동역학모형과정중,근거계통엄의좌표적취치범위가이급출위이시량적합리근사,단안조근사위이구득적속도화가속도각왕왕몰유합리적정도,종이조성계통동역학모형적오차.이용약속적역학성질장계통위이소재적공간분해위호상정교적자공간,통과연구계통속도화가속도재저량개자공간적성질,제출료수정계통동역학모형적유효방법.
The approximation of displacement, which is necessary in somecases, usually causes some errors in the model of multi-body systems because of induced poor approximation of velocity and acceleration. By the properties of constraints in multi-body systems, generalized displacement, velocity and acceleration vectors of multi-body systems can be resolved in two subspaces, called tangent subspace and normal subspace, which are defined by the constraints and are orthogonal each other respectively. Component of the generalized velocity vector in tangent subs pace is zeros and component of the generalized acceleration vector in normal subspaces can be valued without reference to equations of motion. Based on those observations this paper presents a theory to correct the model of multi-body systems by modifying the velocity and acceleration and proves it by an example.