The injective spectrum of a right noetherian ring

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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A note on the invertible ideal theorem

Glasgow Mathematical Journal ◽

10.1017/s0017089500005371 ◽

1984 ◽

Vol 25 (1) ◽

pp. 27-30 ◽

Cited By ~ 2

Author(s):

Andy J. Gray

Keyword(s):

Prime Ideal ◽

Local Ring ◽

Simple Proof ◽

Noetherian Ring ◽

Principal Ideal ◽

Central Element ◽

Commutative Case ◽

Additional Information ◽

The Subject

This note is devoted to giving a conceptually simple proof of the Invertible Ideal Theorem [1, Theorem 4·6], namely that a prime ideal of a right Noetherian ring R minimal over an invertible ideal has rank at most one. In the commutative case this result may be easily deduced from the Principal Ideal Theorem by localizing and observing that an invertible ideal of a local ring is principal. Our proof is partially analogous in that it utilizes the Rees ring (denned below) in order to reduce the theorem to the case of a prime ideal minimal over an ideal generated by a single central element, which can be easily dealt with by adapting the commutative argument in [8]. The reader is also referred to the papers of Jategaonkar on the subject [5, 6, 7], particularly the last where another proof of the theorem appears which yields some additional information.

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Super height of an ideal in a Noetherian ring

Journal of Algebra ◽

10.1016/0021-8693(88)90194-9 ◽

1988 ◽

Vol 116 (1) ◽

pp. 1-6 ◽

Cited By ~ 2

Author(s):

Jee Koh

Keyword(s):

Noetherian Ring

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On Grothendieck's local duality theorem

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100055870 ◽

1979 ◽

Vol 85 (3) ◽

pp. 431-437 ◽

Cited By ~ 3

Author(s):

M. H. Bijan-Zadeh ◽

R. Y. Sharp

Keyword(s):

Algebraic Geometry ◽

Commutative Algebra ◽

Noetherian Ring ◽

Duality Theorem ◽

Great Emphasis ◽

Triangulated Category ◽

Elementary Approach ◽

Commutative Noetherian Ring ◽

Local Duality ◽

Dualizing Complexes

In (11) and (12), a comparatively elementary approach to the use of dualizing complexes in commutative algebra has been developed. Dualizing complexes were introduced by Grothendieck and Hartshorne in (2) for use in algebraic geometry; the approach to dualizing complexes in (11) and (12) differs from that of Grothendieck and Hartshorne in that it avoids use of the concepts of triangulated category, derived category, and localization of categories, and instead places great emphasis on the concept of quasi-isomorphism of complexes of modules over a commutative Noetherian ring.

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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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Primary decomposition of homogeneous ideal in idealization of a module

Studia Scientiarum Mathematicarum Hungarica ◽

10.1556/012.2018.55.3.1391 ◽

2018 ◽

Vol 55 (3) ◽

pp. 345-352

Author(s):

Tran Nguyen An

Keyword(s):

Noetherian Ring ◽

Primary Decomposition ◽

Associated Primes ◽

Homogeneous Ideal ◽

Finitely Generated ◽

Commutative Noetherian Ring ◽

Irreducible Decomposition

Let R be a commutative Noetherian ring, M a finitely generated R-module, I an ideal of R and N a submodule of M such that IM ⫅ N. In this paper, the primary decomposition and irreducible decomposition of ideal I × N in the idealization of module R ⋉ M are given. From theses we get the formula for associated primes of R ⋉ M and the index of irreducibility of 0R ⋉ M.

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CHAIN CONDITIONS ON NON-SUMMANDS

Journal of Algebra and Its Applications ◽

10.1142/s0219498811004707 ◽

2011 ◽

Vol 10 (03) ◽

pp. 475-489 ◽

Cited By ~ 1

Author(s):

PINAR AYDOĞDU ◽

A. ÇIĞDEM ÖZCAN ◽

PATRICK F. SMITH

Keyword(s):

Noetherian Ring ◽

Jacobson Radical ◽

Finitely Generated ◽

Chain Conditions ◽

Finite Dimensional

Let R be a ring. Modules satisfying ascending or descending chain conditions (respectively, acc and dcc) on non-summand submodules belongs to some particular classes [Formula: see text], such as the class of all R-modules, finitely generated, finite-dimensional and cyclic modules, are considered. It is proved that a module M satisfies acc (respectively, dcc) on non-summands if and only if M is semisimple or Noetherian (respectively, Artinian). Over a right Noetherian ring R, a right R-module M satisfies acc on finitely generated non-summands if and only if M satisfies acc on non-summands; a right R-module M satisfies dcc on finitely generated non-summands if and only if M is locally Artinian. Moreover, if a ring R satisfies dcc on cyclic non-summand right ideals, then R is a semiregular ring such that the Jacobson radical J is left t-nilpotent.

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SKEW POLYNOMIAL RINGS SATISFYING $R$-BND PROPERTY

Tamkang Journal of Mathematics ◽

10.5556/j.tkjm.23.1992.4533 ◽

1992 ◽

Vol 23 (2) ◽

pp. 109-116

Author(s):

REFAAT M. SALEM

Keyword(s):

Noetherian Ring ◽

Polynomial Rings ◽

Skew Polynomial Rings ◽

Skew Polynomial

In this paper we show that, a prime right Noetherian ring $A$ satisfies $T(A) = n <\infty$ iff $A[x, \sigma]$ satisfies $r$-Bnd $(n + 1)$.

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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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