1) completely regular
完全正则
1.
Introducing the concept of Rees matrix semigroups of matrix type,we prove the equivalence of completely simple matrix semigroups and this kind of Rees matrix semigroups, and characterize the minimal ideal of a topological matrix semigroup as well as the completely regular matrix semigroups.
引入矩阵型Rees矩阵半群的概念,证明完全单的矩阵半群等价于矩阵型Rees矩阵半群,进而给出矩阵拓扑半群的极小理想的刻画以及完全正则矩阵半群特别是一些重要类别的群带的刻画。
2.
In the second chapter ,we give the definition of the normal subset of aπ-regular semigroup S , the normal equivalence on E(S) and then we give the description of completely regular congruence pairs of S.
本文主要利用同余的核和迹讨论π-正则半群上的完全正则同余对,并把结果推广到GV-半群和E-反演半群上。
2) Completely regular Locale
完全正则Locale
3) complete regularity
完全正则性
1.
This paper is devoted to the study of complete regularity of L fuzzy topological spaces.
研究了LF拓扑空间的完全正则性,引入完全正则LF集和LF拓扑空间的完全正则化的概念并给出了等价刻画。
5) completely regular space
完全正则空间
1.
This paper gives a definition of weak uniformity on set X, and an equival condition of completely regular spaces, that is, a topological space (X,T) is a completely regular space if and only if there exists a weak uniformity on X, and T() is the topology induced by the weak uniformity.
给出了集合X上的弱一致结构的定义 ,通过弱一致结构给出了刻画完全正则空间的一个等介刻画 ,即拓扑空间 (X ,T)是完全正则空间的充分必要条件为X上存在一个弱一致结构 ,其中T是该弱一致结构所诱导的拓扑 。
2.
In this paper,some results on compactifications and Stone-Cech compactification ofcompletely regular spaces are obtained and an important theorem on N-points compactification isproved.
研究了完全正则空间紧化及Stone-Cech紧化的若干性质,获得了T_2空间N点紧化的一个重要定理。
6) completely regular semigroup
完全正则半群
1.
Fuzzy congruence pairs of the completely regular semigroup;
完全正则半群的模糊同余对
2.
A constructing method for completely regular semigroup;
完全正则半群的一个构造方法
3.
The Green's relation of semiring whose additive reduct is completely regular semigroup
加法半群为完全正则半群的半环上Green关系
补充资料:完全正则半群
完全正则半群
completely - regular semi - group
完全正则半群【。扣lple城y一代gular semi一g娜p;.n,班业PeryJ.P一翻no几y印ynna」 同01场班d半群(Clifford sem卜grouP).
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