1) inversion,topological
拓扑式转换
2) topological transformation
拓扑转换
1.
This paper defined the basic concept of configuration topological transformation for modular self-reconfigurable (MSR) robots, and summed up the discipline of the optimal topological transformation, then employed a genetic algorithm for this topological transformation optimization.
定义了模块化自重构机器人构形拓扑转换的基本概念,分析总结了最优构形拓扑转换的规律,并采用遗传算法对构形拓扑转换进行优化。
2.
This paper defines the basic concept of configuration topological transformation of underwater modular self-reconfigurable robots, and sums up the discipline of the optimal topological transformation.
定义了水下模块化自重构机器人构形拓扑转换基本概念 ,并分析总结出构形拓扑转换的基本规律 。
3) optimal topological transformation
最优拓扑转换
4) Topology information conversion
拓扑信息转换
5) topological inversion
拓朴式转换
6) topological transformation
拓扑变换
1.
Their topological transformation method is studied,and geometrical models for four topological structures of 6-PSS parallel mechanisms are given,which provide a theoretical basis and innovation method for the study of parallel mechanisms.
引入拓扑学理论,定义了并联机构的拓扑空间,分析了并联机构的拓扑特征;研究了并联机构的拓扑变换方法,给出了6-PSS并联机构的4种拓扑结构的几何模型,为并联机构构型的研究提供了理论基础和创新方法。
2.
A decoupling method of the fuzzy relational systems with typical topological transformations has been discussed.
针对模糊关系系统的解耦问题,提出了可解耦的充分条件及构造模糊串联补偿解耦器的具体方法;在此基础上,进一步讨论了在一类拓扑变换下模糊关系系统的解耦方法。
3.
A new technique for the topological transformation of knowledge models is introduced which can make probleim easier to solve and slinplify the problem-solving process.
综述了知识表示方法中现行的变换技术,指出了其局限性,并提出了一种既便于问题求解,又易于问题求解的新变换技术──知识模型的拓扑变换。
补充资料:拓扑结构(拓扑)
拓扑结构(拓扑)
topologies 1 structure (topology)
拓扑结构(拓扑)【t哪d哈eal structure(to和如罗);TO-no“orHtlec~cTpyKTypa」,开拓扑(oPen to和fogy),相应地,闭拓扑(closed topofogy) 集合X的一个子集族必(相应地居),满足下述J胜质: 1.集合x,以及空集叻,都是族。(相应地容)的元素. 2。(相应地2劝.。中有限个元素的交集(相应地,居中有限个元素的并集),以及已中任意多个元素的并集(相应地,居中任意多个元素的交集),都是该族中的元素. 在集合X上引进或定义了拓扑结构(简称拓扑),该集合就称为拓扑空间(topological sPace),其夕。素称为.l5(points),族份(相应地居)中元素称为这个拓扑空问的开(open)(相应地,闭(closed))集. 若X的子集族份或莎之一已经定义,并满足性质l及2。。(或相应地l及2衬,则另一个族可以对偶地定义为第一个集族中元素的补集族. fl .C .A二eKeaH及pos撰[补注1亦见拓扑学(zopolo群);拓扑空l’ed(toPo1O廖-c:,l印aee);一般拓扑学(general toPO】ogy).
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