关于内射模和投射模的挠论性质

设R是有单位元的环.τ表示左R—模范畴中的一个挠理论.本文首先研究了τ—内射模、τ—投射模的有关性质,给出一些等价命题.对QF-环作了刻画,其次讨论了τ—内射模的局部化问题;最后刻画了模的τ—挠根结构及补根.文中有关挠理论的概念见[l].     

半模的投射盖和半模的根

引入了半模的投射盖和半模的根的初步的定义，给出了半模范畴中投射盖和根的几个初步的结果，推广了模的投射盖和根的一些性质．     

关于伪投射模的若干讨论

给出了伪投射模的另外一种等价定义,并对伪投射模的自同态环的Jacobson根做了讨论,还对伪投射盖做了某些探讨.     

伪投射模的特征

本文运用伪投射模刻划了半单环、左遗传环、完全环、半完全环、拟完全环和半局部环的性质和特征。     

弱直投射模和弱直内射模

引入了弱直投射和弱直内射模的概念，给出了它们的一些性质。使用弱直投射和弱直内射模刻划了遗传环、半遗传环、半单环和ＱＦ－环。     

相对半投射和直投射模

In this paper, the ＂relative＂ version of semi-projectivity is considered. Let M and N be modules. N is called M-semi-projective, if any homomorphism from N to an M-eyclie submodule f（M） of N can be factored through to a homomorphism from N to M and f, where f∈[M, N]. Some properties of relative semi-projectivity are obtained. Next, we consider a wider class of ＂elatively semi-projective＂ modules such as ＂elatively direct-projective＂ modules which were introduced by Nicholson and Zhou. Several properties of their homomorphisms are also obtained.     

有限生成平坦模的投射性和内射性

本文给出了每个有限生成平坦模内射，既投射又内射的环类的刻划．给出了每个有限生成平坦模既投射又内射这一环类的分类     

T投射模与G半单环

本文研究 T 投射模与 T 投射覆盖,刻划了 G 半单环类,并推广了一般投射覆盖的一些结论.     

亚投射环的积和矩阵扩张

亚投射环是一类重要的环,它满足比J（R）＝0更强的条件,本文的主要目的是回答关于亚投射环的两个问题,进一步获得了关于亚－Grothendieck群的一个结果。     

量子代数的内射模与Tilting模

A=Z[ν] m ' m是 Z[ν]的由ν- 1和奇素数 p生成的理想 .U是 A上的量子代数 .设 k是特征为零的代数闭域 .A→ K (ν|→ξ)是代数同态 ,并假定ξ不是 1的根或ξ是 p次本原根 .命Uk=U k A.J是 UK- Tilting模范畴 .对 λ∈ X+,M(λ)表首权为 λ的不可分解 UK- Tilting模 .本文证明了 ,对每个λ∈ X+,M(λ)作为 Uk 模是内射的当且仅当λ- (p- 1 )ρ∈ X+.我们还给出了内射 Uk模的若干充要条件 .     

LUV环及其群环上的模

本文证明了正则ＬＵＶ环是有限个唯一分解整环的直和，并进而讨论了ＬＵＶ环上群环上的模。     

EXPLICIT DESCRIPTION OF A CLASS OF INDECOMPOSABLE INJECTIVE MODULES

Let R be a commutative Noetherian ring and p be a prime ideal of R such that the ideal pRp is principal and ht(p)≠ 0. In this note, the anthors describe the explicit structure of the injective envelope of the R-module R/p.     

COTORSION MODULES AND PROJECTIVE DIMENSION ONE

If T is a perfect torsion theory for a category of modules over a commutative ring R, a module C is called T—cotorsion provided Hom_R(Q_T,C) = 0 = Ext_R (Q_T,C) where Q_T denotes the T-injective hull of R. Motivated by the now classical results of D. K. Harrison for abelian groups and of E. Matlis for modules over a domain, the theory of T—cotorsion modules is extended. For example, a category equivalence is obtained between the category of T—compact T-cotorsion modules and the category of T-torsion T-reduced modules. The class of T-divisible modules (homomorphic images of T-injective modules) is shown to be closed under formation of extensions if and only if pd_RQ_T ≤ 1, in the case that Q_T is T—cocritical.     

ABSOLUTELY E-PURE MODULES AND E-PURE SPLIT MODULES

We first introduce the concepts of absolutely E-pure modules and E-pure split modules. Then, we characterize the IF rings in terms of absolutely E-pure modules. The E-pure split modules are also characterized.     

Gorenstein Modules and Dualizing Modules

In this article, we study the characterizations of Gorenstein injective left S-modules and finitely generated Gorenstein projective left R-modules when there is a dualizing S-R-bimodule associated with a right noetherian ring R and a left noetherian ring S.     

Injective and Projective Properties of <Emphasis Type="Italic">R</Emphasis>[<Emphasis Type="Italic">x</Emphasis>]-Modules

We study whether the projective and injective properties of left R-modules can be implied to the special kind of left R[x]-modules, especially to the case of inverse polynomial modules and Laurent polynomial modules.