group congruence 中文意思是什麼
group congruence
解釋
群體協調一致- group : n 1 群;批,簇。2 集團,團體,小組。3 【化學】基,團,組;(周期表的)屬,族。4 (雕塑等的)群像...
- congruence : n. 1. 適合,和諧,【語法】一致。2. 【數學】疊合,相合,全等;同余(式)(線)匯。
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Congruence relation and quotient group
同余關系與商群 -
We also describe the group congruence class by the subset tu, and we show that tvp = ropot, where p is a congruence and r is a group congruence of s. we describe some properties of a unitary and dense e - semigroup
還指出:半群s的任意同余p與它的群同余,的並, v廠一n嚴認文章還使某些結論在酉的稠密e半群中得到體現並進一步簡化 -
Finally, we show that is a semilattice of groups congru - ence if and only if ( na ) u is a seminormal subsemigroup on 5, where pna is a group congruence on the semilattice congruence class sa of 5
在這一章的最後文章緒出了半群s上的半格同燃so上的群同余pno的並i 』 upe成為s上的群的半格同余的充分必要條件為u ( na切oeyoey是s的半正規子半群 -
Rough ideals in a semigroup have been studied and the concepts of rough subsemigroups, rough ideals been first introduced by kuroki n. under the condition of the congruence relation, rough sets of a subsemigroup was proved to be its subsemigroup, while that of a left ( right, bisides ) ideal was also proved to be its left ( right, bisides ) ideal. next, rough sets in a group have been studied and the concepts of rough subgroups, rough nornal subgroups been first introduced
Kurokin研究了半群中的粗理想,首次提出了粗子半群和粗理想的概念,證明了在同余關系下,半群的粗糙集是半群,左(右,雙)理想的粗糙集是左(右,雙)理想。接著,他又研究了群中的粗糙集,首次提出了粗子群和粗正規子群的概念,證明了在群中一固定的正規子群所決定的同余關系下,子群的粗糙集是子群,正規子群的粗糙集是正規子群。 -
In the description of group congruence, we give the generalization of the results of d. r. latorre [ 1 ]
Latorre對正則半群作的一些結果推廣到了一般半群。 -
Fonally, in a ring, the corresponding results of a semigroup and a group are generalized. fuzzy rough sets in a ring is studied and the concepts of r fuzzy rough subrings, fuzzy rough ideals are been first introduced. under the condition of the congruence relation determined by a given ideal in a ring, fuzzy rough sets of a fuzzy subring is proved to be its fuzzy subring, while that of a fuzzy ideal is also proved to be its fuzzy ideal
最後,把半群和群中的相應結果推廣到來了環中,引入了模糊粗糙子環和模糊粗糙理想的概念,得出在環中一固定的理想所決定的同余關系下,模糊子環的模糊粗糙集是模糊子環,模糊左(右,雙)理想的模糊粗糙集是模糊左(右,雙)理想。 -
The greatest idempotent - separating congruence and group congruences on a weakly inverse semigroup
弱逆半群上最大冪等元分離同余和群同余 -
A note on the greatest idempotent - separating congruence and group congruences on a weakly inverse semigroup
關於弱逆半群上最大冪等元分離同余和群同余的注記 -
In the second chapter, we give the description of the least group congruence on a - regular semigroup s. in the third chapter, we describe the group congruences on a semigroup s and construct the semilattice of groups congruence on it
本文的第三章對一般半群上的群同余作了描述,並且對其群的半格同余進行了構造。在對群同余的描述中,事實上是把d
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