Behavior of the Auslander condition with respect to regradings

We show that a noetherian ring graded by an abelian group of finite rank satisfies the Auslander condition if and only if it satisfies the graded Auslander condition. In addition, we also study the injective dimension, the global dimension and the Cohen–Macaulay property from the same perspective as that for the Auslander condition. A key step of our approach is to establish homological relations between a graded ring [Formula: see text], its quotient ring modulo the ideal [Formula: see text] and its localization ring with respect to the Ore set [Formula: see text], where [Formula: see text] is a homogeneous regular normal non-invertible element of [Formula: see text].

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Some properties of non-commutative regular graded rings

Glasgow Mathematical Journal ◽

10.1017/s0017089500008843 ◽

1992 ◽

Vol 34 (3) ◽

pp. 277-300 ◽

Cited By ~ 91

Author(s):

Thierry Levasseur

Keyword(s):

Noetherian Ring ◽

Global Dimension ◽

Supplementary Condition ◽

Graded Rings ◽

Finitely Generated ◽

Injective Dimension ◽

Commutative Case ◽

Finite Global Dimension ◽

Image Position ◽

Dimension One

Let A be a noetherian ring. When A is commutative (of finite Krull dimension), A is said to be Gorenstein if its injective dimension is finite. If A has finite global dimension, one says that A is regular. If A is arbitrary, these hypotheses are not sufficient to obtain similar results to those of the commutative case. To remedy this problem, M. Auslander has introduced a supplementary condition. Before stating it, we recall that the grade of a finitely generated (left or right) module is defined by

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The canonical modules of graded rings defined by generic matrices

Nagoya Mathematical Journal ◽

10.1017/s002776300001919x ◽

1981 ◽

Vol 81 ◽

pp. 105-112 ◽

Cited By ~ 2

Author(s):

Yuji Yoshino

Keyword(s):

Polynomial Ring ◽

Quotient Ring ◽

Graded Rings ◽

Canonical Module ◽

Graded Ring ◽

The Ideal

Let k be a field, and X = [xij] be an n × (n + m) matrix whose elements are algebraically independent over k.We shall study the canonical module of the graded ring R, which is a quotient ring of the polynomial ring A = k[X] by the ideal αn(X) generated by all the n × n minors of X.

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Family of quotients of some special rings

Journal of Algebra and Its Applications ◽

10.1142/s021949881850233x ◽

2018 ◽

Vol 17 (12) ◽

pp. 1850233 ◽

Cited By ~ 1

Author(s):

Maryam Salimi

Keyword(s):

Local Ring ◽

Noetherian Ring ◽

Local Cohomology ◽

Proper Ideal ◽

Rees Algebra ◽

Commutative Noetherian Ring ◽

Ideal Formula ◽

Local Cohomology Modules ◽

Cohomology Modules ◽

The Ideal

Let [Formula: see text] be a commutative Noetherian ring and let [Formula: see text] be a proper ideal of [Formula: see text]. We study some properties of a family of rings [Formula: see text] that are obtained as quotients of the Rees algebra associated with the ring [Formula: see text] and the ideal [Formula: see text]. We deal with the strongly cotorsion property of local cohomology modules of [Formula: see text], when [Formula: see text] is a local ring. Also, we investigate generically Cohen–Macaulay, generically Gorenstein, and generically quasi-Gorenstein properties of [Formula: see text]. Finally, we show that [Formula: see text] is approximately Cohen–Macaulay if and only if [Formula: see text] is approximately Cohen–Macaulay, provided some special conditions.

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Localizations of injective modules

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091500017089 ◽

1985 ◽

Vol 28 (3) ◽

pp. 289-299 ◽

Cited By ~ 6

Author(s):

K. R. Goodearl ◽

D. A. Jordan

Keyword(s):

Positive Integer ◽

Noetherian Ring ◽

Simple Module ◽

Global Dimension ◽

Injective Hull ◽

Injective Dimension ◽

Commutative Noetherian Ring ◽

Injective Modules ◽

Noetherian Domain ◽

Left And Right

The question of whether an injective module E over a noncommutative noetherian ring R remains injective after localization with respect to a denominator set X⊆R is addressed. (For a commutative noetherian ring, the answer is well-known to be positive.) Injectivity of the localization E[X-1] is obtained provided either R is fully bounded (a result of K. A. Brown) or X consists of regular normalizing elements. In general, E [X-1] need not be injective, and examples are constructed. For each positive integer n, there exists a simple noetherian domain R with Krull and global dimension n+1, a left and right denominator set X in R, and an injective right R-module E such that E[X-1 has injective dimension n; moreover, E is the injective hull of a simple module.

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Injective homogeneity and the Auslander–Gorenstein property

Glasgow Mathematical Journal ◽

10.1017/s0017089500031098 ◽

1995 ◽

Vol 37 (2) ◽

pp. 191-204 ◽

Cited By ~ 7

Author(s):

Zhong Yi

Keyword(s):

Noetherian Ring ◽

Projective Dimension ◽

Global Dimension ◽

Noetherian Rings ◽

Connected Component ◽

Injective Dimension ◽

The Right

In this paper we refer to [13] and [16] for the basic terminology and properties of Noetherian rings. For example, an FBNring means a fully bounded Noetherian ring [13, p. 132], and a cliqueof a Noetherian ring Rmeans a connected component of the graph of links of R[13, p. 178]. For a ring Rand a right or left R–module Mwe use pr.dim.(M) and inj.dim.(M) to denote its projective dimension and injective dimension respectively. The right global dimension of Ris denoted by r.gl.dim.(R).

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Cohomological dimension with respect to the linked ideals

Journal of Algebra and Its Applications ◽

10.1142/s0219498821501048 ◽

2020 ◽

pp. 2150104

Author(s):

Maryam Jahangiri ◽

Khadijeh Sayyari

Keyword(s):

Noetherian Ring ◽

Cohomological Dimension ◽

Commutative Noetherian Ring ◽

Ideal Formula ◽

The Ideal

Let [Formula: see text] be a commutative Noetherian ring. Using the new concept of linkage of ideals over a module, we show that if [Formula: see text] is an ideal of [Formula: see text] which is linked by the ideal [Formula: see text], then [Formula: see text] where [Formula: see text]. Also, it is shown that for every ideal [Formula: see text] which is geometrically linked with [Formula: see text] [Formula: see text] does not depend on [Formula: see text].

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A note on Noetherian orders in Artinian rings

Glasgow Mathematical Journal ◽

10.1017/s0017089500003827 ◽

1979 ◽

Vol 20 (2) ◽

pp. 125-128 ◽

Cited By ~ 5

Author(s):

A. W. Chatters

Keyword(s):

Noetherian Ring ◽

Quotient Ring ◽

Triangular Matrix ◽

Idempotent Element ◽

Noetherian Rings ◽

Central Idempotent ◽

Matrix Rings ◽

Regular Elements ◽

Zero Divisors ◽

Left And Right

Throughout this note, rings are associative with identity element but are not necessarily commutative. Let R be a left and right Noetherian ring which has an Artinian (classical) quotient ring. It was shown by S. M. Ginn and P. B. Moss [2, Theorem 10] that there is a central idempotent element e of R such that eR is the largest Artinian ideal of R. We shall extend this result, using a different method of proof, to show that the idempotent e is also related to the socle of R/N (where N, throughout, denotes the largest nilpotent ideal of R) and to the intersection of all the principal right (or left) ideals of R generated by regular elements (i.e. by elements which are not zero-divisors). There are many examples of left and right Noetherian rings with Artinian quotient rings, e.g. commutative Noetherian rings in which all the associated primes of zero are minimal together with full or triangular matrix rings over such rings. It was shown by L. W. Small that if R is any left and right Noetherian ring then R has an Artinian quotient ring if and only if the regular elements of R are precisely the elements c of R such that c + N is a regular element of R/N (for further details and examples see [5] and [6]). By the largest Artinian ideal of R we mean the sum of all the Artinian right ideals of R, and it was shown by T. H. Lenagan in [3] that this coincides in any left and right Noetherian ring R with the sum of all the Artinian left ideals of R.

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On Duality Relative to Self-orthogonal Bimodules

Algebra Colloquium ◽

10.1142/s1005386705000313 ◽

2005 ◽

Vol 12 (02) ◽

pp. 319-332

Author(s):

Jun Wu ◽

Wenting Tong

Keyword(s):

Noetherian Ring ◽

Injective Dimension ◽

Left And Right

Let R be a left and right Noetherian ring and RωR a faithfully balanced self-orthogonal bimodule. We introduce the notions of special embeddings and modules of ω-D-class n, and then give some characterizations of them. As an application, we study the properties of RωR with finite injective dimension. Our results extend the main results in [4].

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Proregular sequences, local cohomology, and completion

MATHEMATICA SCANDINAVICA ◽

10.7146/math.scand.a-14399 ◽

2003 ◽

Vol 92 (2) ◽

pp. 161 ◽

Cited By ~ 53

Author(s):

Peter Schenzel

Keyword(s):

Noetherian Ring ◽

Local Cohomology ◽

Čech Complex ◽

Regular Sequences ◽

Local Cohomology Modules ◽

Derived Functors ◽

Adic Completion ◽

Cech Complex ◽

Cohomology Modules ◽

The Ideal

As a certain generalization of regular sequences there is an investigation of weakly proregular sequences. Let $M$ denote an arbitrary $R$-module. As the main result it is shown that a system of elements $\underline x$ with bounded torsion is a weakly proregular sequence if and only if the cohomology of the Čech complex $\check C_{\underline x} \otimes M$ is naturally isomorphic to the local cohomology modules $H_{\mathfrak a}^i(M)$ and if and only if the homology of the co-Čech complex $\mathrm{RHom} (\check C_{\underline x}, M)$ is naturally isomorphic to $\mathrm{L}_i \Lambda^{\mathfrak a}(M),$ the left derived functors of the $\mathfrak a$-adic completion, where $\mathfrak a$ denotes the ideal generated by the elements $\underline x$. This extends results known in the case of $R$ a Noetherian ring, where any system of elements forms a weakly proregular sequence of bounded torsion. Moreover, these statements correct results previously known in the literature for proregular sequences.

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When Are Graded Rings Graded S-Noetherian Rings

Mathematics ◽

10.3390/math8091532 ◽

2020 ◽

Vol 8 (9) ◽

pp. 1532

Author(s):

Dong Kyu Kim ◽

Jung Wook Lim

Keyword(s):

Noetherian Ring ◽

Semigroup Ring ◽

Noetherian Rings ◽

Homogeneous Ideal ◽

Commutative Monoid ◽

Graded Rings ◽

Graded Ring ◽

Special Case

Let Γ be a commutative monoid, R=⨁α∈ΓRα a Γ-graded ring and S a multiplicative subset of R0. We define R to be a graded S-Noetherian ring if every homogeneous ideal of R is S-finite. In this paper, we characterize when the ring R is a graded S-Noetherian ring. As a special case, we also determine when the semigroup ring is a graded S-Noetherian ring. Finally, we give an example of a graded S-Noetherian ring which is not an S-Noetherian ring.

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