semilattices of semigroups 半群的半格
semilattices of nil-extentions 矩形群的nil
refined semilattices of semigroups 半群的加细半格
strong semilattices of left groups 左群的强半格
strong semilattices of right groups 右群的强半格
There existα∈Y with a,b∈S_α, and (a,b)∈ρ_α. We also get the least Clifford-semigroup congruence on semilattices of nil-extensions of left groups and semilattices of nil-extensions of right groups.
存在α∈Y,使a,b∈S_α,且(a,b)∈ρ_α,从而也得到了左群的nil-扩张的半格,右群的nil-扩张的半格的最小C-半群同余。
参考来源 - 拟正则半群的同余和性质·2,447,543篇论文数据,部分数据来源于NoteExpress
As a consequence of the above result, we have that implicative semilattices form an algebraic variety.
作为一个推论给出:蕴涵半格构成一个代[代数]簇。
The main topic is some applications of refined semilattices of semigroups in the study of properties and structures of semigroups.
本文主要讨论了半群的加细半格在研究半群的性质和结构中的若干应用。
In making researches on uniform bands and some uniform properties of corresponding semilattices, we advance a conception of strong orthodox semigroups.
本文在研究匀称带及其对应半格的匀称性中,提出了强纯整半群的概念。
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