EuDML | Browse

We show how to use the extension and torsion functors in order to compute the torsion submodule of a differential module associated with a multidimensional control system. In particular, we show that the concept of the weak primeness of matrices corresponds to the torsion-freeness of a certain module.

A General Resolution for Grade Four Gorenstein Ideals.

Andrew R. Kustin, Matthew Miller (1981)

Manuscripta mathematica

A Generalization of Baer's Lemma

Molly Dunkum (2009)

Czechoslovak Mathematical Journal

There is a classical result known as Baer’s Lemma that states that an $R$ -module $E$ is injective if it is injective for $R$ . This means that if a map from a submodule of $R$ , that is, from a left ideal $L$ of $R$ to $E$ can always be extended to $R$ , then a map to $E$ from a submodule $A$ of any $R$ -module $B$ can be extended to $B$ ; in other words, $E$ is injective. In this paper, we generalize this result to the category $q_{ω}$ consisting of the representations of an infinite line quiver. This generalization of Baer’s Lemma...

A Generalization of the Class Group.

Elbert M. Pirtle (1974)

Monatshefte für Mathematik

A generalization of the finiteness problem of the local cohomology modules

Ahmad Abbasi, Hajar Roshan-Shekalgourabi (2014)

Czechoslovak Mathematical Journal

Let $R$ be a commutative Noetherian ring and $𝔞$ an ideal of $R$ . We introduce the concept of $𝔞$ -weakly Laskerian $R$ -modules, and we show that if $M$ is an $𝔞$ -weakly Laskerian $R$ -module and $s$ is a non-negative integer such that ${Ext}_{R}^{j} (R / 𝔞, H_{𝔞}^{i} (M))$ is $𝔞$ -weakly Laskerian for all $i < s$ and all $j$ , then for any $𝔞$ -weakly Laskerian submodule $X$ of $H_{𝔞}^{s} (M)$ , the $R$ -module ${Hom}_{R} (R / 𝔞, H_{𝔞}^{s} (M) / X)$ is $𝔞$ -weakly Laskerian. In particular, the set of associated primes of $H_{𝔞}^{s} (M) / X$ is finite. As a consequence, it follows that if $M$ is a finitely generated $R$ -module and $N$ is an $𝔞$ -weakly...

A homological characterization of local complete intersections

T. H. Gulliksen (1971)

Compositio Mathematica

A K-Theoretic Approach to Multiplicities.

Marc Levine (1985)

Mathematische Annalen

A lower bound for coherences on the Brown-Peterson spectrum.

Richter, Birgit (2006)

Algebraic & Geometric Topology

A new version of Local-Global Principle for annihilations of local cohomology modules

K. Khashyarmanesh, M. Yassi, A. Abbasi (2004)

Colloquium Mathematicae

Let R be a commutative Noetherian ring. Let and be ideals of R and let N be a finitely generated R-module. We introduce a generalization of the -finiteness dimension of $f_{}^{} (N)$ relative to in the context of generalized local cohomology modules as $f_{}^{} (M, N) : = i n f i \geq 0 | \subseteq \sqrt (0 :_{R} H_{}^{i} (M, N))$ , where M is an R-module. We also show that $f_{}^{} (N) \leq f_{}^{} (M, N)$ for any R-module M. This yields a new version of the Local-Global Principle for annihilation of local cohomology modules. Moreover, we obtain a generalization of the Faltings Lemma.

Currently displaying 1 – 20 of 60

Page 1 Next

Displaying 1 – 20 of 60

A broken circuit ring.

A calculation of injective dimension over valuation domains

A Change of Ring Theorem with Applications to Poincaré Series and Intersection Multiplicity.

A corollary to the Evans-Griffith Syzygy theorem

A counterexample to a conjecture of Barr.

A counterexample to a conjecture on linear systems on $ℙ^{3}$ .

A criterion for detecting m-regularity.

A functorial approach to the behaviour of multidimensional control systems

A General Resolution for Grade Four Gorenstein Ideals.

A Generalization of Baer's Lemma

A Generalization of the Class Group.

A generalization of the finiteness problem of the local cohomology modules

A homological characterization of local complete intersections

A K-Theoretic Approach to Multiplicities.

A lower bound for coherences on the Brown-Peterson spectrum.

A new version of Local-Global Principle for annihilations of local cohomology modules

A note on PG-modules.

A note on the Hilbert scheme of curves of degree $d$ and genus $(\binom{d - 3}{2}) - 1$ .

A Note on the Hochschild Homology and Cyclic Homology of a topological Algebra.

A note on the Stanley-Reisner ring of a join and of a suspension.

Currently displaying 1 – 20 of 60