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1.
F-V-环的广义内射性刻划 总被引:1,自引:0,他引:1
设F是含单位元的结合环R上的左Gabriel拓朴,称R是F-V-环,如果商范畴(R,F)-Mod中的所有单对象都是内射对象。本文我们利用左R-模的vN-内射性及拟内射性给出F-V-环的特征刻划。 相似文献
2.
设F是含单位元的结合环R上的左Gabriel拓朴,称R是F-V-环,如果商范畴(R,F)-Mod中的所有单对象都是内射对象。本文我们利用左R-模的vN-内射性及拟内射性给出F-V-环的特征刻划。 相似文献
3.
Liu Zhongkui 《东北数学》1994,(3)
OnRightHereditaryRingsandDedekindDomainsLiuZhongkui(刘仲奎)(DepartmentofMathematics,NorthwestNormalUniversity,Lanzhou,730070)Abs... 相似文献
4.
称左R-模M是ecg-扩张模,如果M的任意基本可数生成子模是M的直和因子的基本子模.在研究了ecg-扩张模的基本性质的基础上,本文证明了对于非奇异环R,所有左R-模是ecg-扩张模当且仅当所有左R-模是扩张模.同时我们还用ecg-拟连续模刻画了Noether环和Artin半单环. 相似文献
5.
In this article, we investigate when every simple module has a projective (pre)envelope. It is proven that (1) every simple right R-module has a projective preenvelope if and only if the left annihilator of every maximal right ideal of R is finitely generated; (2) every simple right R-module has an epic projective envelope if and only if R is a right PS ring; (3) Every simple right R-module has a monic projective preenvelope if and only if R is a right Kasch ring and the left annihilator of every maximal right ideal of R is finitely generated. 相似文献
6.
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
7.
《Quaestiones Mathematicae》2013,36(1):33-48
Abstract For an arbitrary left R-module M, we denote by F(M) the class of left R-modules F such that for any exact sequence 0 → A α→ B of left R-modules and any R-homomorphism β: A → M factoring through F, there exists an R- homomorphism γ: B → M such that β = γα. For any given class R of left R-modules, we denote ∩E?R F(M) by F(R) or simply by 9 if the context is clear. The class of short exact sequences E of left R-modules relative to which each ME'JR has the injective property, is denoted by E(R) or just &. Relative properties of RR, F and E are investigated for a given class R. The special case where JR is the class of all pure-injective left R-modules is explored. In this way the class F of coflat left R-modules is introduced and it is pointed out that a module is coflat if and only if it is absolutely pure. 相似文献
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9.
Dinh van Huynh 《代数通讯》2013,41(3):607-614
By a well-known result of Osofsky [6, Theorem] a ring R is semisimple (i.e. R is right artinian and the Jacobson radical of R is zero) if and only if every cyclic right R-module is injective. Starting from this, a larger class of rings has been introduced and investigated, namely the class of right PCI rings. A ring R is called right PCI if every proper cyclic right R- module is injective (proper here means not being isomorphic to RR). By [l] and [Z], a right PCI ring is either semisimple or it is a right noetherian, right hereditary simple ring. The latter ring is usually called a right PCI domain. In this paper we consider the similar question in studying rings whose cyclic right modules satisfy some decomposition property. The starting point is a theorem recently proved in 13, Theorem 1.1): A ring R is right artinian if and only if every cyclic right R- module is a direct sum of an injective module and a finitely cogenerated module. 相似文献
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11.
Periodica Mathematica Hungarica - A ring R is called a left FGF ring if every finitely generated left R-module can be embedded in a free left R-module. It is proved that a group ring RG is left FGF... 相似文献
12.
E. Matlis proved that if R is an integral domain with quotient field Q and K is the R-module Q/R, then all torsion R-modules decompose into a direct sum of local submodules if and only if K decomposes into a direct sum of local submodules. Thus K is a test module to determine whether torsion modules decompose. We generalize this result to commutative rings. If R is a commutative ring and a torsion theory of R is given by a Gabriel topology , then form the ring of quotients R and let K be the cokernel of the canonical ring homomorphism from R to R. In some special cases, every -torsion R-module decomposes into a direct sum of local submodules if and only if K decomposes. However, there is an example where this is not the case. The principal result is: given R, and K, there is a related filter K of ideals of R, which is a subset of , such that all K-pretorsion R-modules decompose into a direct sum of local submodules if and only if K decomposes. The relationship between and K is investigated. 相似文献
13.
Alexander Kreuzer 《Journal of Geometry》1992,45(1-2):105-113
First it will be shown that every left-noetherian AH-ring is left-artinian. For an AH-ring R every finite linearly independent subset of a free left R-module V can be completed to a basis of V. But a maximal linearly independent subset of a free left R-module V need not be a basis of V. For an H-ring R, every maximal linearly independent subset of a free left R-module V is a basis of V if and only if the H-ring R is left-noetherian or V is finitely generated. 相似文献
14.
设R是有单位元的环,X是所有半单左R一模及Singular左R-模构成的模类,M是循环的extending左R一模,本文证明了若M的所有循环子商都是2型X-extending模,则M具有有限一致维数,该结果推广了著名的Osofsky-Smith定理。 相似文献
15.
设M是左R-模,本文证明了M是局部Noether的当且仅当σ[M]中的任意M-内射左R-模的直和是S∧2-连续的(S∧2-拟连续的)。 相似文献
16.
We generalize a theorem of Bourbaki: Let R be a noetherian ring and M a finitely generated torsionfree R-module with rank r. Assume further M to be free for all ∈ Spec R with depth ? 1. Then there exists a free submodule F in M such that M/F is isomorphic to an ideal in R. There are some applications due to E.G.Evans,Jr. and M. Auslander, concerning the group Ko (R) resp. reflexive R-modules and - in case R is Gorenstein - R-modules of finite length. 相似文献
17.
Edgar E. Enochs 《代数通讯》2013,41(13):4821-4831
Let R be a commutative and noetherian ring. It is known tht if R is local with maximal ideal M and F is a flat R-module, then the Hausdorff completion F of F with the M-adic topology is flat. We show that if we assume that the Krull dimension of R is finite, then for any ideal I C R, the Hausdorff completion F* of a flat module F with the I-adic topology is flat. Furthermore, for a flat module F over such R, there is a largest ideal I such that F is Hausdorff and complete with the I-adic topology. For this I, the flat R/I-module F/IF will not be Hausdorff and complete with respect to the topology defined by any non-zero ideal of R/I. As a tool in proving the above, we will show that when R has finite Krull dimension, the I-adic Hausdorff completion of a minimal pure injective resolution of a flat module F is a minimal pure injective resolution of its completion F*. Then it will be shown that flat modules behave like finitely generated modules in the sense that on F* the I-adic and the completion topologies coincide, so F* is I-adically complete. 相似文献
18.
左R-模M称为Eω-内射模,如果对环R中任意的ω阶Euclid理想I来说,任何R-模同态能够拓展为R-模同态。左R-模M称为Eω-投射模,若对环R中任意的ω阶Euclid理想I和任何R-模同态f∈HomR(M,R/I),存在R-模同态g∈HomR(M,R)使得f=πg,其中π是自然同态。本文证明P和Q均是Eω-投射模当且仅当PQ是Eω-投射模。进而,又证明了每一个左R-模是Eω-投射的当且仅当每一个左R-模是Eω-内射。 相似文献
19.
Noether环上的幂稳定自由模 总被引:1,自引:0,他引:1
设I是Noether环R的投射理想, Im=In, m≠n. 该文证明, 有限生成投射右R - 模幂稳定自由当且仅当(1) 存在环S使得I|m-n|( S ( R且有限生成投射S - 模是幂稳定自由; (2) 有限生成投射右R/I|m-n| - 模幂稳定自由. 相似文献
20.
满足R—左模同态链归纳条件之环 总被引:2,自引:0,他引:2
环的链条件已得到深入的研究,其成果相当丰富。许永华曾提出过一种新的链条件,即R—左模同态链归纳条件。此条件完全脱离了以往的链条件的有限性,且是著名的Kthe猜测成立的充分必要条件。本文的目的是要指出:此条件不仅能使Kthe猜想成立,而且还可以得出另一些有意义的结果。我们引进了一个环的Levitzki子集的概念。从而证明了:环R的Levitzki根包含R的任何诣零单侧理想的充分必要条件是R满足每个Levitzki子集上R—左模同态链归纳条件。 本文同时还讨论了Kegel猜测:环R的两个局部幂零子环之和仍为局部幂零的。我们得到的结果是:如果环R=A B,A为R的诣零左理想,B为R的谐零子环,则R是局部幂零的。当且仅当R满足R-L(R)的每一子集上R-左模同态链归纳条件。此处L(R)为R的Levitzki根。 本文所讨论的环都是结合环(不要求有单位元)。没有给出明确定义的术语其意义与[1]相同。 相似文献