A Gorenstein Ring with Larger Dilworth Number than Sperner Number

There are relatively few classes of local rings (R, m) for which the question of the rationality of the Poincaré serieswhere k = R/m, has been settled. (For an example of a local ring with non-rational Poincaré series see the recent paper by D. Anick, “Construction of loop spaces and local rings whose Poincaré—Betti series are nonrational”, C. R. Acad. Sc. Paris 290 (1980), 729-732.) In this note, we compute the Poincaré series of a certain family of local Cohen-Macaulay rings and obtain, as a corollary, the rationality of the Poincaré series of d-dimensional local Gorenstein rings (R, m) of embedding dimension at least e + d – 3, where e is the multiplicity of R. It follows that local Gorenstein rings of multiplicity at most five have rational Poincaré series.

Download Full-text

Almost Gorenstein rings arising from fiber products

Canadian Mathematical Bulletin ◽

10.4153/s000843952000051x ◽

2020 ◽

pp. 1-18

Author(s):

Naoki Endo ◽

Shiro Goto ◽

Ryotaro Isobe

Keyword(s):

Local Ring ◽

The Other ◽

Gorenstein Ring ◽

Local Rings ◽

Regular Local Ring ◽

Gorenstein Rings ◽

Fiber Product

Abstract The purpose of this paper is, as part of the stratification of Cohen–Macaulay rings, to investigate the question of when the fiber products are almost Gorenstein rings. We show that the fiber product $R \times _T S$ of Cohen–Macaulay local rings R, S of the same dimension $d>0$ over a regular local ring T with $\dim T=d-1$ is an almost Gorenstein ring if and only if so are R and S. In addition, the other generalizations of Gorenstein properties are also explored.

Download Full-text

A Note on Gorenstein Rings of Embedding Codimension Three

Nagoya Mathematical Journal ◽

10.1017/s002776300001566x ◽

1973 ◽

Vol 50 ◽

pp. 227-232 ◽

Cited By ~ 50

Author(s):

Junzo Watanabe

Keyword(s):

Local Ring ◽

Arbitrary Dimension ◽

Three Dimensional ◽

Regular Sequence ◽

Complete Intersections ◽

Gorenstein Ring ◽

Regular Local Ring ◽

Gorenstein Rings ◽

Number Of Generators ◽

Five Elements

Let A = R/, where R is a regular local ring of arbitrary dimension and is an ideal of R. If A is a Gorenstein ring and if height = 2, it is easily proved that A is a complete intersection, i.e., is generated by two elements (Serre [5], Proposition 3). Hence Gorenstein rings which are not complete intersections are of embedding codimension at least three. An example of these rings is found in Bass’ paper [1] (p. 29). This is obtained as a quotient of a three dimensional regular local ring by an ideal which is generated by five elements, i.e., generated by a regular sequence plus two more elements. In this paper, suggested by this example, we prove that if A is a Gorenstein ring and if height = 3, then is minimally generated by an odd number of elements. If A has a greater codimension, presumably there is no such restriction on the minimal number of generators for , as will be conceived from the proof.

Download Full-text

On the Generalized Auslander–Reiten Conjecture under Certain Ring Extensions

Canadian Mathematical Bulletin ◽

10.4153/cmb-2014-052-9 ◽

2015 ◽

Vol 58 (1) ◽

pp. 134-143

Author(s):

Saeed Nasseh

Keyword(s):

Local Ring ◽

Gorenstein Ring ◽

Ring Extensions

AbstractWe show that under some conditions a Gorenstein ring R satisfies the Generalized Auslander–Reiten conjecture if and only if R[x] does. When R is a local ring we prove the same result for some localizations of R[x].

Download Full-text

A Characterization of Gorenstein Rings and Grothendieck's Conjecture

Algebra Colloquium ◽

10.1142/s1005386709000613 ◽

2009 ◽

Vol 16 (04) ◽

pp. 653-660

Author(s):

Kazem Khashyarmanesh

Keyword(s):

Local Ring ◽

Regular Sequence ◽

Negative Integer ◽

Finitely Generated ◽

Gorenstein Rings ◽

Noetherian Local Ring ◽

Filter Regular Sequence ◽

System Of Parameters

Given a commutative Noetherian local ring (R, 𝔪), it is shown that R is Gorenstein if and only if there exists a system of parameters x1,…,xd of R which generates an irreducible ideal and [Formula: see text] for all t > 0. Let n be an arbitrary non-negative integer. It is also shown that for an arbitrary ideal 𝔞 of a commutative Noetherian (not necessarily local) ring R and a finitely generated R-module M, [Formula: see text] is finitely generated if and only if there exists an 𝔞-filter regular sequence x1,…,xn∈ 𝔞 such that [Formula: see text] for all t > 0.

Download Full-text

A function on the set of isomorphism classes in the stable category of maximal Cohen-Macaulay modules over a Gorenstein ring: with applications to liaison theory

MATHEMATICA SCANDINAVICA ◽

10.7146/math.scand.a-25728 ◽

2017 ◽

Vol 120 (2) ◽

pp. 161 ◽

Cited By ~ 1

Author(s):

Tony J. Puthenpurakal

Keyword(s):

Local Ring ◽

Representation Type ◽

Gorenstein Ring ◽

Stable Category ◽

Finite Representation ◽

Finite Representation Type ◽

Isomorphism Classes ◽

Liaison Theory ◽

Gorenstein Local Ring ◽

Infinite Set

Let $(A,\mathfrak{m})$ be a Gorenstein local ring of dimension $d \geq 1$. Let $\operatorname{\underline{CM}}(A)$ be the stable category of maximal Cohen-Macauley $A$-modules and let $\operatorname{\underline{ICM}}(A)$ denote the set of isomorphism classes in $\operatorname{\underline{CM}}(A)$. We define a function $\xi \colon \operatorname{\underline{ICM}}(A) \to \mathbb{Z}$ which behaves well with respect to exact triangles in $\operatorname{\underline{CM}}(A)$. We then apply this to (Gorenstein) liaison theory. We prove that if $\dim A \geq 2$ and $A$ is not regular then the even liaison classes of $\{\,\mathfrak{m}^n \mid n\geq 1 \,\}$ is an infinite set. We also prove that if $A$ is Henselian with finite representation type with $A/\mathfrak{m}$ uncountable then for each $m \geq 1$ the set $\mathcal {C}_m = \{\, I \mid I \text { is a codim $2$ CM-ideal with } e_0(A/I) \leq m \,\}$ is contained in finitely many even liaison classes $L_1,\dots ,L_r$ (here $r$ may depend on $m$).

Download Full-text

On Injective and Gorenstein Injective Dimensions of Local Cohomology Modules

Algebra Colloquium ◽

10.1142/s1005386715000784 ◽

2015 ◽

Vol 22 (spec01) ◽

pp. 935-946 ◽

Cited By ~ 6

Author(s):

Majid Rahro Zargar ◽

Hossein Zakeri

Keyword(s):

Local Ring ◽

Local Cohomology ◽

Proper Ideal ◽

Finitely Generated ◽

Gorenstein Rings ◽

Noetherian Local Ring ◽

Dualizing Complex ◽

Local Cohomology Modules ◽

Gorenstein Injective ◽

Cohomology Modules

Let (R, 𝔪) be a commutative Noetherian local ring and M an R-module which is relative Cohen-Macaulay with respect to a proper ideal 𝔞 of R, and set n := ht M𝔞. We prove that injdim M < ∞ if and only if [Formula: see text] and that [Formula: see text]. We also prove that if R has a dualizing complex and Gid RM < ∞, then [Formula: see text]. Moreover if R and M are Cohen-Macaulay, then Gid RM < ∞ whenever [Formula: see text]. Next, for a finitely generated R-module M of dimension d, it is proved that if [Formula: see text] is Cohen-Macaulay and [Formula: see text], then [Formula: see text]. The above results have consequences which improve some known results and provide characterizations of Gorenstein rings.

Download Full-text

Presentations of rings with a chain of semidualizing modules

MATHEMATICA SCANDINAVICA ◽

10.7146/math.scand.a-96668 ◽

2017 ◽

Vol 121 (2) ◽

pp. 161

Author(s):

Ensiyeh Amanzadeh ◽

Mohammad T. Dibaei

Keyword(s):

Local Ring ◽

Gorenstein Ring ◽

Semidualizing Modules ◽

Dualizing Module ◽

A Chain

Inspired by Jorgensen et al., it is proved that if a Cohen-Macaulay local ring $R$ with dualizing module admits a suitable chain of semidualizing $R$-modules of length $n$, then $R\cong Q/(I_1+\cdots +I_n)$ for some Gorenstein ring $Q$ and ideals $I_1,\dots , I_n$ of $Q$; and, for each $\Lambda \subseteq [n]$, the ring $Q/(\sum _{\ell \in \Lambda } I_\ell )$ has some interesting cohomological properties. This extends the result of Jorgensen et al., and also of Foxby and Reiten.

Download Full-text

Acyclic Complexes and Gorenstein Rings

Algebra Colloquium ◽

10.1142/s1005386720000474 ◽

2020 ◽

Vol 27 (03) ◽

pp. 575-586

Author(s):

Sergio Estrada ◽

Alina Iacob ◽

Holly Zolt

Keyword(s):

Analogous Result ◽

Gorenstein Ring ◽

Gorenstein Rings ◽

Injective Modules ◽

Flat Modules ◽

Coherent Ring ◽

Acyclic Complexes ◽

Gorenstein Flat ◽

Gorenstein Injective

For a given class of modules [Formula: see text], let [Formula: see text] be the class of exact complexes having all cycles in [Formula: see text], and dw([Formula: see text]) the class of complexes with all components in [Formula: see text]. Denote by [Formula: see text][Formula: see text] the class of Gorenstein injective R-modules. We prove that the following are equivalent over any ring R: every exact complex of injective modules is totally acyclic; every exact complex of Gorenstein injective modules is in [Formula: see text]; every complex in dw([Formula: see text][Formula: see text]) is dg-Gorenstein injective. The analogous result for complexes of flat and Gorenstein flat modules also holds over arbitrary rings. If the ring is n-perfect for some integer n ≥ 0, the three equivalent statements for flat and Gorenstein flat modules are equivalent with their counterparts for projective and projectively coresolved Gorenstein flat modules. We also prove the following characterization of Gorenstein rings. Let R be a commutative coherent ring; then the following are equivalent: (1) every exact complex of FP-injective modules has all its cycles Ding injective modules; (2) every exact complex of flat modules is F-totally acyclic, and every R-module M such that M+ is Gorenstein flat is Ding injective; (3) every exact complex of injectives has all its cycles Ding injective modules and every R-module M such that M+ is Gorenstein flat is Ding injective. If R has finite Krull dimension, statements (1)–(3) are equivalent to (4) R is a Gorenstein ring (in the sense of Iwanaga).

Download Full-text

Joint reductions and Rees algebras

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100069796 ◽

1991 ◽

Vol 109 (2) ◽

pp. 335-342 ◽

Cited By ~ 6

Author(s):

J. K. Verma

Keyword(s):

Local Ring ◽

Main Tool ◽

Embedding Dimension ◽

Rees Algebras ◽

Minimal Multiplicity

Let R be a Cohen-Macaulay local ring of dimension d, multiplicity e and embedding dimension v. Abhyankar [1] showed that v − d + 1 ≤ e. When equality holds, R is said to have minimal multiplicity. The purpose of this paper is to study the preservation of this property under the formation of Rees algebras of several ideals in a 2-dimensional Cohen-Macaulay (CM for short) local ring. Our main tool is the theory of joint reductions and mixed multiplicities developed by Rees [9] and Teissier[12].

Download Full-text