拉格朗日点附近编队研究中很重要的一个领域为编队控制。
Formation control is one of the important research fields in formation flying around Lagrange point.
研究了地月三角拉格朗日点编队及基于编队的干涉任务设计问题。
Finally, the formation flying problems near Earth-Moon triangular Lagrange points and corresponding interferometry technologies are studied.
该探测器将停留在一个叫拉格朗日点的地区附近,太阳系有五个类似这样的点。
The probe will stay near an area called a Lagrangian point - there are five similar points.
然后基于不变流形理论和庞加莱截面方法,设计了不同拉格朗日点间转移轨道。
Then on the basis of invariant manifold theory and Poincaré section, a transfer trajetory between L1 and L2 of the Earth-Moon system was given.
研究了编队飞行的控制系统结构和共线拉格朗日点附近的周期轨道保持控制问题。
Secondly, the control system structure and station keeping problems near collinear Lagrange points are studied.
由于拉格朗日点的独特空间位置,它附近的编队研究对深空探测有着很重要的意义。
The formation flying around Lagrange points will benefit deep space exploration greatly due to the special location of the Lagrange points.
特洛伊银河体系:为双体系统中拉格朗日点上一个天体的,尤指小行星,或与之相关的。
Of or relating to a celestial body, especially an asteroid, that is in one of the Lagrangian points of a two-body system.
木星、海王星和火星在其轨道前方60度或后方60度的所谓“拉格朗日点”上均有一批这样的石块。
Jupiter, Neptune and Mars all have collections of rocks sitting in the so-called Lagrange points 60 degrees ahead of or behind the planets in their orbits.
另一方面,奇美拉从26,000年以前就在许多拉格朗日点上设置威力强大的小型植入物监哨站。
Chimera, on the other hand, had small but powerful implant stations positioned at various Lagrange points for the last 26,000 years.
如果一切顺利,下一个目标将是第一个拉格朗日点(这个点在到月球路程的85%处,该点地月引力平衡)。
If all goes well, the next target will be L1, the point 85% of the way to the moon where the gravitational pulls of moon and Earth balance.
然而,要想完成所有的任务,丽萨首先就必须到达达“拉格朗日点”,只有到达了拉格朗日点,宇宙飞船才可以在不远离地球的情况下平稳漂浮。
To do all that, however, LISA first has to get to a "Lagrange point", a place where spacecraft can float stably while getting no farther from the earth.
关键的一点是,拉格朗日拟序结构中的界限可以在群体间互换,正如一个人被挤进了错误的人群接着随着人群驶向错误的方向。
Crucially, they form a barrier to exchange between groups, as anyone who has been caught up in a crowd and pulled inexorably in the wrong direction will know.
该算法使用了一种有效的表格查找和拉格朗日乘法器对分搜索办法,能够较快的收敛到最佳的功率点。
By means of the approach of look-up table and Lagrange? Multiplier bisect searching, this algorithm can be convergent to the optimal point of power rapidly.
给出了拉格朗日微分中值定理和第一积分中值定理中值点的渐进性的更一般性的结果及其简洁证明。
Gives more general results on the gradualness of the median point of Lagranges median theorem and first median theorem for integrals and its succinct proof.
当位移和动量的拉格朗日多项式近似阶数满足一定条件时,可以自然导出保辛算法的不动点格式。
A fixed point iteration formula can be derived when the order of the approximate polynomials of displacements and momentum satisfy some certain conditions.
当位移和动量的拉格朗日多项式近似阶数满足一定条件时,可以自然导出保辛算法的不动点格式。
A fixed point iteration formula can be derived when the order of the approximate polynomials of displacements and momentum satisfy some certain conditions.
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