1) perfect group
完全群
1.
Making use of some conceptions and theorems of automorphism group and perfect group, obtains a relevant conclusion which is very close to the H?lder theorem without exception.
运用自同构群和完全群的有关概念和定理,得到了一个与Hlder定理非常接近而又不包含例外情况的相应结论。
2.
By using the property of perfect group and the known results obtained,this paper finds a set of basis of augmentation ideals for this group,so the structure of its quotinet groups can be determined.
利用完全群的一些性质及数学归纳法,得到了此类群任意次增广理想的一组基底,并且解决了增广商群的结构问题。
2) full modular group
完全模群
3) completely simple semigroups
完全单半群
1.
In chapter one,characterizations of congruences on regularsemigroups and completely simple semigroups are introduced.
第一章引言部分主要介绍了正则半群,完全单半群上同余的刻划以及逆半群的Rees矩阵半群上某些同余的描述。
4) completely Archimedean semigroups
完全Archimedean半群
5) completely simple semigroup
完全单半群
1.
A constructing method for completely regular semigroup is offered by using completely simple semigroup,semilattice and constructing functions.
对完全正则半群用完全单半群、半格和结构函数给出一种构造方法,同时研究完全正则半群同态与结构函数的关系,讨论完全正则半群的织积。
2.
The author discusses the problem of the semidirect products of completely simple semigroups without identity element.
在去掉幺元的情况下,讨论了完全单半群的半直积问题。
3.
In this paper, we studied the structure and vertex transitive property of directed Cayley graphs Cay(S, A) on completely simple semigroup with degree 2.
本文讨论了2度完全单半群有向Cayley图Cay(S,A)的结构和顶点传递性质。
6) completely simple seimgroup
完全单半群
1.
The congruence admissible triples and congruence knots on completely simple seimgroup;
完全单半群上的相容组与同余结
补充资料:完全群
完全群
complete group
完全群[complete gn川p;co砂ep山组.a,rpyllna] 中心(见群的中心(沈ntre of a grouP))平凡的群(即所谓无中心群(gouP without ontre)),且它的所有自同构皆为内自同构(ilmer automorphism).完全群G的自同构群同构于G本身(术语“完全”即相应于这个性质).完全群的例子有对称群(s ymmetric『oup)S,,n笋2,6.如群T包含一个完全的jE规子群,则T可分解为子群B及B在T中的中心化子K的盲积T=BxK.
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