1) eventually PI-strong wrpp semigroup
毕竟PI-强wrpp半群
1.
The aim of this paper is to study eventually strong wrpp semigroup whose satisfy permutation idemtities,that is,eventually PI-strong wrpp semigroups,the structure of such semigroup is obtained.
该文的目的是研究满足置换恒等式的毕竟强wrpp半群,即所谓的毕竟PI-强wrpp半群,得到毕竟PI-强wrpp半群的结构刻画。
2) eventually strong wrpp semigroup
毕竟强wrpp半群
1.
The aim of this paper is to study eventually strong wrpp semigroup whose satisfy permutation idemtities,that is,eventually PI-strong wrpp semigroups,the structure of such semigroup is obtained.
半群S的每个L(**)-类都含有幂等元,就称S为毕竟wrpp半群,特别地,如果对任意a∈S,La(**)∩Ia都只含唯一的幂等元a+,就称为毕竟强wrpp半群。
3) eventually PI-strongly rpp semigroup
毕竟PI-强rpp半群
1.
By using this result, a new simply proof of the structural theorem of eventually PI-strongly rpp semigroups is to be given.
利用这一结论 ,给出了毕竟PI-强rpp半群的结构定理的一个新证
4) PI-strongly wrpp semigroup
PI强wrpp半群
5) eventually C-wrpp semigroup
毕竟C-wrpp半群
1.
On eventually C-wrpp semigroups;
关于毕竟C-wrpp半群
6) eventually orthodox super-wrpp semigroup
毕竟纯整超wrpp半群
1.
we give a definition of eventually orthodox super-wrpp semigroup and discuss the structure of eventually orthodox super-wrpp semigroups.
本文共分三章,具体内容如下: 第一章给出了毕竟纯整超wrpp半群的定义,并给出了这类半群的结构定理。
补充资料:毕竟依
【毕竟依】
(术语)佛之德号也。佛为众生究竟之依处,故称毕竟依。赞阿弥陀佛偈曰:“清净光明无有对,故佛又号无对光。遇斯光者业垢除,是故稽首毕竟依。”
(术语)佛之德号也。佛为众生究竟之依处,故称毕竟依。赞阿弥陀佛偈曰:“清净光明无有对,故佛又号无对光。遇斯光者业垢除,是故稽首毕竟依。”
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