1) (normal) subhypermodule
(正规)子超模
2) hyper-intuitionistic fuzzy normal subgroups
超直觉模糊正规子群
3) formal method ov VLSI
[电子]超大规模集成电路正规方法
4) normal fuzzy hyperideal
正规模糊超理想
1.
The concept of normal fuzzy hyperideals of hyperrings is introduced and then some fuzzy isomorphism theorems of hyperrings is obtained by normal fuzzy hyperideals.
引入超环的正规模糊超理想概念,利用其刻画超环的模糊同构定理。
5) anti-fuzzy normal subgroups
反模糊正规子群
1.
Using the~1λ-Threshold,some definitions of the anti-fuzzy subgroups,anti-fuzzy normal subgroups,anti-fuzzy normalize and anti-fuzzy centralizer are introduced.
利用1λ-截集引入了反模糊子群、反模糊正规子群、反模糊正规化子及反模糊中心化子的概念,并讨论了它们的性质。
2.
The definitions and some properties of the anti-fuzzy subgroups and anti-fuzzy normal subgroups are given in paper[1].
文[1]给出了反模糊子群与反模糊正规子群的定义及性质,本文将给出反模糊子群的反模糊正规子群的定义及性质。
3.
Using the λ-Threshold,some definitions of the anti-fuzzy subgroups,anti-fuzzy normal subgroups,anti-fuzzy normalize and anti-fuzzy centralizer are introduced.
本文利用λ-截集引入了反模糊子群、反模糊正规子群、反模糊正规化子及反模糊中心化子的概念,并讨论了它们的性质。
6) anti-fuzzy normalize
反模糊正规化子
1.
Using the~1λ-Threshold,some definitions of the anti-fuzzy subgroups,anti-fuzzy normal subgroups,anti-fuzzy normalize and anti-fuzzy centralizer are introduced.
利用1λ-截集引入了反模糊子群、反模糊正规子群、反模糊正规化子及反模糊中心化子的概念,并讨论了它们的性质。
2.
Using the λ-Threshold,some definitions of the anti-fuzzy subgroups,anti-fuzzy normal subgroups,anti-fuzzy normalize and anti-fuzzy centralizer are introduced.
本文利用λ-截集引入了反模糊子群、反模糊正规子群、反模糊正规化子及反模糊中心化子的概念,并讨论了它们的性质。
3.
Based on the definitions and some properties of the anti-fuzzy subgroups and anti-fuzzy normal subgroups,the definitions of anti-fuzzy normalize,anti-fuzzy centralizer,anti-fuzzy conjugate subgroups are introduced and some properties are discussed.
基于已有反模糊子群及反模糊正规子群的概念及性质,给出了反模糊正规化子,反模糊中心化子,共扼子群的概念并讨论了它们的性质,最后讨论了生成反模糊子群。
补充资料:正规嵌入的子空间
正规嵌入的子空间
nwmaily -imbedded
正规嵌入的子空间【~曰y~加山曰U目的甲.;一aop-M幼叨。pacuo加耽朋Oe no八npoc冲姐cTaOI 空间X的子空间A,它在X中的每个邻域U,都存在一个集合H,是X中可数多个闭集之并,并且A CHCU.若A正规嵌人X,而X正规嵌人Y,则A正规嵌人Y.正规空间(加m川sp朗e)的正规嵌人子空间,就其诱导拓扑而言,本身是正规空间.这就说明了名称的缘由.空间的最终紧性等价于它可正规嵌人该空间的某个(因而任何)紧化(com·pac断ca石on).一般而言,最终紧空间的正规嵌人子空间本身是最终紧空间、【补注】终紧空间(6刀司卜一c0lr甲actsPace)就是U咳日证空间(Lindej6fsPaCe).胡师度、白苏华译
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