共查询到19条相似文献,搜索用时 312 毫秒
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本文给出了基本的弱正则*-半群的一个结构定理.作为这一结构定理的特 殊情形,基本的正则*-半群的一个新的结构被给出. 相似文献
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本文引入弱交换po-半群的概论2,研究这类半群到Archimedean子半群的半格分解,得到了这半群类似于具平凡序的弱交换半群的一个特征,由此在更一般的情形下回答了Kehayopulu在「1」中提出的一个问题,并作为推论得到弱交换poe-半群和具平凡序的弱交换半群的已知结果。 相似文献
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本文通过一个序半群S上的一些二元关系以及它的理想(右理想,双理想)的根集分别给出了该序半群是阿基米德(右阿基米德,t-阿基米德)序子半群的链的刻画.进一步证明了准素序半群是阿基米德序半群的链.最后,通过素根定理证明了序半群S是阿基米德序子半群的链当且仅当S是阿基米德序子半群的半格且S的所有素理想关于集合的包含关系构成链. 相似文献
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作为拟C-半群的推广,本文定义了左半正则纯整群并群,给出了它的左半织积结构。讨论了两类特殊的右(右)半正则纯整群并半群,得出了左(右)半正则纯整群并半群类与拟C-半群类之间的关系。 相似文献
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本文通过一个序半群S上的一些二元关系以及它的理想的根集的性质该序半群是阿基米德半群的半格,特别地是阿基米德半群的链的刻划,证明了S是阿基米德链当且仅当S是准素的.通过序半群的m-系的概念,证明了S的任意半素理想是含它的所有素理想的交,并通过该结论,证明了S是阿基米德半群的链当且仅当S是阿基米德半群的半格且S的所有素理想关于集包含关系构成链.作为应用,该结论在一般的半群(没有序)[1]中也成立. 相似文献
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给出半格序半群的V同余的生成定理,讨论了半格序同态的一些性质,假设M是一个L-半群S的凸的L-子半群,本文讨论了M的L-同态象还是凸的L-子半群的一个充分条件。 相似文献
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本文讨论所有循环平坦系满足条件(P)的幺半群的“元素--理想”特征问题,该问题至今仍未获解决,在S是左PSF幺半群的条件下,本文证明了所有循环平坦右S-系满足条件(P)当且仅当S的任意元x或者是右可消元,或者是右零元,当且仅当对S的任意真右理想I,或存在a∈I-Ia,或I中的所有元素均为右零元,该结果改进并推广了「4」、「7」、「8」、「15」中的部分结果。 相似文献
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U-半富足半群和U-富足半群是富足半群的推广,作为富足半群的一种推广,超R-幂幺半群是超富足半群的子类,文章引入J本原U超富足半群的定义,得到了R-幂幺半群的结构定理. 相似文献
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设S是半群,S是S上所有一一偏的右平移构成的逆半群.在本文中证明了,对Cliford半群S=[Y;Gα,φα,β],Simlim{Gα}α∈Y,而对Brandt半群S=B(G,I),SGwrJ(I). 相似文献
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关于弱交换po-半群 总被引:4,自引:0,他引:4
在本文中我们引入弱交换po-半群的概念,并研究这类半群到其Archimedes子半群的半格分解,给出了这类半群类似于无序半群相应结果的一个刻画。作为推论,我们得到弱交换poe-群和无序半群的相应刻画。 相似文献
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Yonglin Cao 《Semigroup Forum》1999,58(3):386-394
In this paper, concepts of left (right) weakly commutative po-semigroups and r (l or t)-archimedean subsemigroups of a po-semigroup are introduced. Six relations τ, σ, η, ρ, μ, ξ on a po-semigroup are defined. By using them, filters and radicals, fourteen necessary and sufficient conditions in order that a po-semigroup is a semilattice of archimedean subsemigroups are given. The facts that a left weakly commutative (right weakly commutative or weakly commutative) po-semigroup is a semilattice of r (l or t) -archimedean subsemigroups are proved and seven characterizations of these po-semigroups are obtained respectively. 相似文献
14.
作为幂级数环的推广,Ribenboim引入了广义幂级数环的概念.设R是有单位元的交换环,(J,≤)是严格全序半群.本文中我们证明了如下结果:(1)广义幂级数环 [[Rs]]是PP-环当且仅当R是PP-环且B(R)的任意 S-可标子集C在B(R)中有最小上界;(2)如果对任意s∈S都有0≤s,则[[Rs,≤]]是弱PP-环当且仅当R是弱PP-环.我们还给出了一个例子说明交换的弱PP-环可以不是PP-环. 相似文献
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A. R. Chekhlov 《Mathematical Notes》2013,94(3-4):583-589
It is proved that if all the endomorphisms of a reduced torsion-free weakly transitive Abelian group are bounded right-nilpotent, then its ring of endomorphisms is commutative. The ring of endomorphisms of a torsion-free Abelian group with periodic group of automorphisms and Engel ring of endomorphisms is also commutative. 相似文献
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L. G. Rybnikov 《Functional Analysis and Its Applications》2003,37(2):114-122
A Riemannian homogeneous space X=G/H is said to be commutative if the algebra of G-invariant differential operators on X is commutative and weakly commutative if the associated Poisson algebra is commutative. Clearly, the commutativity of X implies its weak commutativity. The converse implication is proved in this paper. 相似文献
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Attila Nagy 《Semigroup Forum》2014,89(2):475-478
A semigroup S is called a weakly commutative semigroup if, for every a,b∈S, there is a positive integer n such that (ab) n ∈Sa∩bS. A semigroup S is called archimedean if, for every a,b∈S, there are positive integers m and n such that a n ∈SbS and b m ∈SaS. It is known that every weakly commutative semigroup is a semilattice of weakly commutative archimedean semigroups. A semigroup S is called a weakly separative semigroup if, for every a,b∈S, the assumption a 2=ab=b 2 implies a=b. In this paper we show that a weakly commutative semigroup is weakly separative if and only if its archimedean components are weakly cancellative. This result is a generalization of Theorem 4.16 of Clifford and Preston (The Algebraic Theory of Semigroups, Am. Math. Soc., Providence, 1961). 相似文献
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M. Behboodi 《Acta Mathematica Hungarica》2006,113(3):243-254
Summary Let M be a left R-module. Then a proper submodule P of M is called weakly prime submodule if for any ideals A and B of R and any submodule N of M such that ABN ⊆ P, we have AN ⊆ P or BN ⊆ P. We define weakly prime radicals of modules and show that for Ore domains, the study of weakly prime radicals of general modules
reduces to that of torsion modules. We determine the weakly prime radical of any module over a commutative domain R with dim (R) ≦ 1. Also, we show that over a commutative domain R with dim (R) ≦ 1, every semiprime submodule of any module is an intersection of weakly prime submodules. Localization of a module over
a commutative ring preserves the weakly prime property. An R-module M is called semi-compatible if every weakly prime submodule of M is an intersection of prime submodules. Also, a ring R is called semi-compatible if every R-module is semi-compatible. It is shown that any projective module over a commutative ring is semi-compatible and that a commutative
Noetherian ring R is semi-compatible if and only if for every prime ideal B of R, the ring R/\B is a Dedekind domain. Finally, we show that if R is a UFD such that the free R-module R⊕ R is a semi-compatible module, then R is a Bezout domain. 相似文献
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In this paper, we introduce the notion of Euclidean module and weakly Euclidean ring. We prove the main result that a commutative ring R is weakly Euclidean if and only if every cyclic R-module is Euclidean, and also if and only if End( R M) is weakly Euclidean for each cyclic R-moduleM. In addition, some properties of torsion-free Euclidean modules are presented. 相似文献