Let $𝒲$ be a self-orthogonal class of left $R$-modules. We introduce a class of modules, which is called strongly $𝒲$-Gorenstein modules, and give some equivalent characterizations of them. Many important classes of modules are included in these modules. It is proved that the class of strongly $𝒲$-Gorenstein modules is closed under finite direct sums. We also give some sufficient conditions under which the property of strongly $𝒲$-Gorenstein module can be inherited by its submodules and quotient modules....

An associated ring R with identity is said to be a left FTF ring when the class of the submodules of flat left R-modules is closed under injective hulls and direct products. We prove (Theorem 3.5) that a strongly graded ring R by a locally finite group G is FTF if and only if Re is left FTF, where e is a neutral element of G. This provides new examples of left FTF rings. Some consequences of this Theorem are given.

We interpret the collection of invertible bimodules as a groupoid and call it the Picard groupoid. We use this groupoid to generalize the classical construction of crossed products to what we call groupoid crossed products, and show that these coincide with the class of strongly groupoid graded rings. We then use groupoid crossed products to obtain a generalization from the group graded situation to the groupoid graded case of the bijection from a second cohomology group, defined by the grading...

Let $𝒯$ be a weak torsion class of left $R$-modules and $n$ a positive integer. A left $R$-module $M$ is called $(𝒯,n)$-injective if ${\mathrm{Ext}}_R^n(C,M)=0$ for each $(𝒯,n+1)$-presented left $R$-module $C$; a right $R$-module $M$ is called $(𝒯,n)$-flat if ${\mathrm{Tor}}_n^R(M,C)=0$ for each $(𝒯,n+1)$-presented left $R$-module $C$; a left $R$-module $M$ is called $(𝒯,n)$-projective if ${\mathrm{Ext}}_R^n(M,N)=0$ for each $(𝒯,n)$-injective left $R$-module $N$; the ring $R$ is called strongly $(𝒯,n)$-coherent if whenever $0\to K\to P\to C\to 0$ is exact, where $C$ is $(𝒯,n+1)$-presented and $P$ is finitely generated projective, then $K$ is $(𝒯,n)$-projective; the ring $R$ is called $(𝒯,n)$-semihereditary...

In this paper we introduce the class of strongly rectifiable and S-homogeneous modules. We study basic properties of these modules, of their pure and refined submodules, of Hill's modules and we also prove an extension of the second Prüfer's theorem.

We show that there is a one-to-one correspondence between basic cotilting complexes and certain contravariantly finite subcategories of the bounded derived category of an artin algebra. This is a triangulated version of a result by Auslander and Reiten. We use this to find an existence criterion for complements to exceptional complexes.

Si supponga che l'anello $𝐑$ ammetta una decomposizione come prodotto subdiretto $𝐑=\underset{\widetilde{\alpha \in 𝚲}}{\times }{𝐑}_{\alpha }$ di anelli ${𝐑}_{\alpha }\ne \mathrm{𝟎}$, tali che per ${𝐒}_{\alpha }=𝐑\cap {𝐑}_{\alpha }$ si abbia ${Ann}_{{𝐑}_{\alpha }}{𝐒}_{\alpha }=\mathrm{𝟎}$ ($\forall \alpha \in A$), e sia $𝐒={\oplus }_{\alpha \in 𝐀}{𝐒}_{\alpha }$. Si scelga un $𝐑$-modulo (destro) $𝐌$ che sia libero da torsione rispetto ad $𝐒$, cioè ${Ann}_{𝐌}𝐒=\mathrm{𝟎}$; allora $𝐌$ può essere rappresentato come prodotto subdiretto irridondante $𝐌\cong \underset{\widetilde{\alpha \in 𝚲}}{\times }{𝐌}_{\alpha }$ degli ${𝐑}_{\alpha }$-moduli ${𝐌}_{\alpha }$ liberi da torsione rispetto ad ${𝐒}_{\alpha }$. Si fa uno studio di un subprodotto generale di una classe $𝐂$ di $𝐑$-moduli ${𝐌}^{(𝐢)}$$...$

Une construction explicite et élémentaire de l’homomorphisme trace pour les applications analytiques locales de type fini entre des espaces normaux est donnée. On généralise le théorème de dualité locale dans le cas où l’anneau local à la source est un anneau de factorisation unique. Des exemples et des applications sont donnés.