共查询到18条相似文献,搜索用时 125 毫秒
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无单位元的群分次环、Smash积及其一个应用 总被引:1,自引:0,他引:1
本文对于具有局部单位元的群分次环R证明了左R#C*-模范畴与分次左R-模范畴是同构的,并给出R是分次右完全环的一些充要条件. 相似文献
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本文研究了Artin代数A与其子代数模范畴中反变有限子范畴之间的关系.利用范畴同构,获得了代数A上投射维数有限的子模范畴P∞(A)在有限生成的左A模范畴A-mod上反变有限的一个条件,推广了关于子范畴P∞(A)反变有限性的结果. 相似文献
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本文对于具有局部单位元的群分次环R证明了在R#G模范畴与分次左R-模范畴是同构的,并给出R是分次右完全环的一些充要条件。 相似文献
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广义FP—内射模、广义平坦模与某些环 总被引:2,自引:0,他引:2
左(右)R-模A称为GFP-内射模,如果ExtR(M,A)=0对任-2-表现R-模M成立;左(右)R-模称为G-平坦的,如果Tor1^R(M,A)=0(Tor1^R(AM)=0)对于任一2-表现右(左)R-模M成立;环R称左(右)R-半遗传环,如果投射左(右)R-模的有限表现子模是投射的,环R称为左(右)G-正而环,如果自由左(右)R-模的有限表现子模为其直和项,研究了GFP-内射模和G-平坦模的一些性质,给出了它们的一些等价刻划,并利用它们刻划了凝聚环,G-半遗传环和G-正则环。 相似文献
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证明了与一个余倾斜双模左正交的有限生成模范畴是函子有限的 .引进了左正交维数 ,给出了自正交模具有有限内射维数的一个充要条件和余倾斜模的一个刻画 相似文献
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朱占敏 《数学年刊A辑(中文版)》2017,38(3):313-326
设R是一个环,n是一个正整数.右R-模M称为强n-内射的,如果从任一自由右R-模F的任一n-生成子模到M的同态都可扩张为F到M的同态;右R-模V称为强n-平坦的,如果对于任一自由右R-模F的任一n-生成子模T,自然映射VT→VF是单的;环R称为左强n-凝聚的,如果自由左R-模的n-生成子模是有限表现的;环R称为左n-半遗传的,如果R的每个n-生成左理想是投射的.本文研究了强n-内射模,强n-平坦摸及左强n-凝聚环.通过模的强n-内射性和强n-平坦性概念,作者还给出了强n-凝聚环和n-半遗传环的一些刻画. 相似文献
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关于SF-环的几点注记 总被引:3,自引:0,他引:3
本文中,我们证明了如下主要结果:Ⅰ 对于环R,下面条件是等价的:(1)R是Artin半单环;(2)R是左SF-环,且R满足特殊右零化于降链条件;(3)R是左SF-环和I-环,且R ̄R具有有限Goldie维数。Ⅱ对于环R,下面条件是等价的:(1)R是VonNeumann正则环;(2)R是左SF-环,且每个苛异循环左R-模的极大子模是平坦的。 相似文献
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In this paper,let m,n be two fixed positive integers and M be a right R-module,we define (m,n)-M-flat modules and (m,n)-coherent modules.A right R-module F is called (m,n) M-flat if every homomorphism from an (n,m)-presented right R-module into F factors through a module in addM.A left S-module M is called an (m,n)-coherent module if MR is finitely presented,and for any (n,m)-presented right R-module K,Horn(K,M) is a finitely generated left S-module,where S = End(MR).We mainly characterize (m,n)-coherent modules in terms of preenvelopes (which are monomorphism or epimorphism) of modules.Some properties of (m,n)-coherent rings and coherent rings are obtained as corollaries. 相似文献
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给出了n-FP-内射模的定义,M为左R-模,如果对任意的左R-模N有Ext1(N,M)=0,则称M为n-FP-内射模,作为应用,给出了n-FP-内射模的一些等价条件. 相似文献
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Liu Zhongkui 《东北数学》1994,(3)
OnRightHereditaryRingsandDedekindDomainsLiuZhongkui(刘仲奎)(DepartmentofMathematics,NorthwestNormalUniversity,Lanzhou,730070)Abs... 相似文献
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Let R be a ring with identity. In this note we study covers of left R-modules by r-injectives left R-modules, where r is a hereditary torsion theory defined in the category of all left R-modules and all R-morphisms. When R is an artinian commutative ring, a complete answer about the existence of such covers for every R-module is given. In case that T is a centrally splitting torsion theory, we can characterize those T for which every left R-module has a T-injective cover. Also we analyze R-modules such that the injective and the T-injective cover are the same. At the end of this note we relate the concepts of colocalization and cover 相似文献
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Let R be a ring. A fight R-module M is called f-projective if Ext^1 (M, N) = 0 for any f-injective right R-module N. We prove that (F-proj,F-inj) is a complete cotorsion theory, where (F-proj (F-inj) denotes the class of all f-projective (f-injective) right R-modules. Semihereditary rings, von Neumann regular rings and coherent rings are characterized in terms of f-projective modules and f-injective modules. 相似文献
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Liu Zhongkui 《东北数学》1995,(4)
CharacterizationsofF-V-ringsbyQuasi-continuousModulesLiuZhongkui(刘仲奎)(DepartmentofMathematics,NorthuestNormalUniversity,Lanch... 相似文献
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A ring R is called right zip provided that if the annihilator τR(X) of a subset X of R is zero, then τR(Y) = 0 for some finite subset Y C X. Such rings have been studied in literature. For a right R-module M, we introduce the notion of a zip module, which is a generalization of the right zip ring. A number of properties of this sort of modules are established, and the equivalent conditions of the right zip ring R are given. Moreover, the zip properties of matrices and polynomials over a module M are studied. 相似文献