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1.
研究了SF-环与P-内射环的关系,构造了SF-环成为P-内射环的一系列条件.证明了SF-环R只要满足其中之一:R的每个极大左理想是有限生成的;特殊右零化子的降链条件;对R的每个极大左理想M,l(M)在R中是本质的,那么R就是P-内射环.在此基础上,利用一定条件下SF-环的P-内射性,发展了SF-环的若干新结果,这些结果部分地拓展了有关文献中的结果.  相似文献   

2.
von-Neumann正则环与左SF-环   总被引:6,自引:0,他引:6  
环R称为左SF-环,如果每个单左R-模是平坦的.众所周知,Von-Neumann正则环是SF-环,但SF-环是否是正则环至今仍是公开问题,本文主要研究左SF-环是正则环的条件,证明了:如果R是左SF-环且R的每个极大左(右)理想是广义弱理想,那么R是强正则环.并且推广了Rege[3]中的相应结果.  相似文献   

3.
N-环Von-Neumann正则性   总被引:10,自引:0,他引:10  
环R称为N-环,如果R的素根N(R)={r∈R|存在自然数n使rn=0}.本文不仅对N-环进行了刻划,而且还研究了N-环的VonNeumann正则性.特别证明了:对于N-环R,如下条件是等价的:(1)R是强正则环;(2)R是正则环;(3)R是左SP-环;(4)R是右SF-环;(5)R是MELT,左p-V-环;(6)R是MERT,右p-V-环.因此推广了文献[4]中几乎所有的重要结果,同时也改进或推广了其它某些有关正则环的有用结果.  相似文献   

4.
Von Neumann正则环和SF—环   总被引:2,自引:0,他引:2  
环 R 称为左 SF-环,如果每个单左 R-模是平坦的.众所周知,Von Neumann 正则环是SF-环,但 SF-环是否是正则环的问题至今仍是公开的.本文研究左 SF-环是正则环的条件,证明了,如果下列之一成立,那么左 SF-环是正则的:(1)循环模的每个极大子模是平坦的;(2)不可分解的商环是左 quasi-duo;(3)极大左理想的左零化子是本质的;(4)满足主左理想的升链条件.  相似文献   

5.
Von Neumann正则环和SF-环   总被引:10,自引:0,他引:10  
环R称为左SF-环,如果每个单左R-模是平坦的。众所周知,Von Neumann正则环是SF-环,但SF-环是否是正则环的问题至今仍是公开的。本文研究左SF-环是正则环的条件,证明了,如果下列之一成立,那么左SF-环是正则的:(1)循环模的每个极大子模是平坦的;(2)不可分解的商环是左quasi-duo;(3)极大左理想的左零化子是本质的;(4)满足主左理想的升链条件。  相似文献   

6.
研究了每一个极大的右理想是拟理想的右SF-环的正则性,得到了右SF-环是正则环的一些新的刻画,推广了一些已知的结论.  相似文献   

7.
关于AP-内射环和AGP-内射环(英文)   总被引:2,自引:0,他引:2  
本文研究了AP-内射环和AGP-内射环的von Neumann正则性问题.利用P-内射环和Y J-内射环的研究方法及GW-理想的性质,得到了AP-内射环和AGP-内射环是(强)正则环的一些条件.推广了文献[7,12,14]中的相关结果.  相似文献   

8.
研究了每一个极大左理想是弱右理想的环的性质.得到了左SF-环和强正则环的一些新的刻画,推广了一些已知的结论.  相似文献   

9.
主要讨论了二次整环的单位、素元、因子分解、二次整环的剩余类环的性质等问题.得到的主要结果有:二次整环的主理想的特征是无限大;当α满足一定条件时,二次整环关于模(α)的剩余类环是无零因子环,其特征为a2-(uaa,bb)+vb2,并且在一定的限制条件下,剩余类环是一个有限域.关键词:  相似文献   

10.
崔建  秦龙 《数学进展》2020,(1):29-38
如果R中每个元素(对应地,可逆元)均可表示为一个幂等元与环R的Jacobson根中一个元素之和,则称环R是J-clean环(对应地,UJ环).所有的J-clean环都是UJ环.作为UJ环的真推广,本文引入GUJ环的概念,研究GUJ环的基本性质和应用.进一步地,研究每个元素均可表示为一个幂等元与一个方幂属于环的Jacobson根的元素之和的环.  相似文献   

11.
由Ramamurthi和Ming的两个公开问题所推动,本文证明了如下结果:(1)如果R是MELT,SF-环,那么R是正则环;(2)如果R是MELT,左CE-内射,右SF-环,那么R是具有有界指数的左和右自内射正则,左和右V-环.这就给出了Ramamurthi和Ming两个公开问题的部分回答.  相似文献   

12.
von Neumann Regular Rings and Right SF-rings   总被引:2,自引:0,他引:2  
A ring R is called a left (right) SF-ring if all simple left (right) R-modules are flat. It is known that von Neumann regular rings are left and right SF-rings. In this paper, we study the regularity of right SF-rings and prove that if R is a right SF-ring whose all maximal (essential) right ideals are GW-ideals, then R is regular.  相似文献   

13.
Zhang Jule  Du Xianneng 《代数通讯》2013,41(7):2445-2451
A ring R is called left (right) SF-ring if all simple left (right) R-modules are flat. It is proved that R is Von Neumann regular if R is a right SF-ring whoe maximal essential right ideals are ideals. This gives the positive answer to a qestion proposed by R. Yue Chi MIng in 1985, and a counterexample is given to settle the follwoing question in the negative: If R is an ERT ring which is one-sided V-ring, is R a left and right V-ring? Some other conditions are given for a SF-ring to be regular.  相似文献   

14.
TheRelativePropertiesofGradedRingRand SmashProductR#GWeiJunchao(魏俊潮);LiLibin(李立斌)(YangzhouInstituteofTechnology,Yangzhou,2250...  相似文献   

15.
in this paper, new characteristic properties of strongly regular rings are' given.Relations between certain generalizations of duo rings are also considered. The followingconditions are shown to be equivalent: (1) R is a strongly regular ring; (2) R is a left SFring such that every product of two independent closed left ideals of R is zero; (3) R is aright SF-ring such that every product of two independent closed left ideals of R is zero; (4)R is a left SF-ring whose every special left annihilator is a quasi-ideal; (5) R is a right SFring whose every special left annihilator is a quasi-ideal; (6) R is a left SF-ring whose everymaximal left ideal is a quasi-ideal; (7) R is a right SF-ring whose every maximal left ideal isa quasi-ideal; (8) R is a left SF-ring such that the set N(R) of all nilpotent elements of R isa quasi-ideal; (9) R is a right SF-ring such that N(R) is a quasi-ideal.  相似文献   

16.
Haiyan Zhou 《代数通讯》2013,41(12):3842-3850
A ring R is called a left (right) SF-ring if all simple left (right) R-modules are flat. It is known that von Neumann regular rings are left and right SF-rings. In this article, we study the regularity of left SF-rings and we prove the following: 1) if R is a left SF-ring whose all complement left (right) ideals are W-ideals, then R is strongly regular; 2) if R is a left SF-ring whose all maximal essential right ideals are GW-ideals, then R is regular.  相似文献   

17.
A ring R is called a left (right) SF-ring if all simple left (right) R-modules are flat. It is known that von Neumann regular rings are left and right SF-rings. In this paper, we study the regularity of right SF-rings and prove that if R is a right SF-ring whose all maximal (essential) right ideals are GW-ideals, then R is regular.  相似文献   

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