本文研究了完全正则半群上的H -相关同余。
In this article, we investigate H-related congruences on completely regular semigroups.
正则半群上的同余是由其幂等元同余类所完全决定的。
The congruences on a regular semigroup is completely determined by its idempotent congruence classes.
介绍弱左正则幺半群的概念,指出在可交换半群中,完全正则、弱左(右)正则和完全幂等是等价的。
In this paper, we introduce the notion of left weakly regular semigroup and show that in a commutative semigroup, the complete regularity, regularity, left resp.
进一步给出完全模糊左理想的概念,讨论了它在正则半群中的一些特殊性质。
Furthermore, the notion of completely fuzzy left ideal is presented and its particular properties in regular semigroups are obtained.
由此推出了P -正则半群上的每个P -同余完全是由其包含幂等元的部分核正规系所决定的。
So We have prove that each P-congruence on P-regular semigroups is uniquely determined by its partial kernel normal systems containing idempotent elements.
拟正则半群上的两个完全正则同余相等当且仅当它们的核正规系相同。
Completely regular congruence on an eventually regular semigroup is uniquely determined by its kernel normal system.
拟正则半群上的两个完全正则同余相等当且仅当它们的核正规系相同。
A Completely regular congruence on an eventually regular semigroup is uniquely determined by its kernel normal system.
拟正则半群上的两个完全正则同余相等当且仅当它们的核正规系相同。
A Completely regular congruence on an eventually regular semigroup is uniquely determined by its kernel normal system.
应用推荐