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Displaying 1 – 20 of 73

A Characterization Of Primal Noetherian Rings.

P.L. Manley (1988)

Revista colombiana de matematicas

A family of noetherian rings with their finite length modules under control

Markus Schmidmeier (2002)

Czechoslovak Mathematical Journal

We investigate the category $mod Λ$ of finite length modules over the ring $Λ = A \otimes_{k} Σ$ , where $Σ$ is a V-ring, i.e. a ring for which every simple module is injective, $k$ a subfield of its centre and $A$ an elementary $k$ -algebra. Each simple module $E_{j}$ gives rise to a quasiprogenerator $P_{j} = A \otimes E_{j}$ . By a result of K. Fuller, $P_{j}$ induces a category equivalence from which we deduce that $mod Λ ≃ ∐_{j} b a d h b o x P_{j}$ . As a consequence we can (1) construct for each elementary $k$ -algebra $A$ over a finite field $k$ a nonartinian noetherian ring $Λ$ such that $mod A ≃ mod Λ$ , (2) find twisted...

A generalization of a theorem of Faith and Menal and applications.

Tsuda, Kentaro (2000)

International Journal of Mathematics and Mathematical Sciences

A generalization of the Auslander transpose and the generalized Gorenstein dimension

Yuxian Geng (2013)

Czechoslovak Mathematical Journal

Let $R$ be a left and right Noetherian ring and $C$ a semidualizing $R$ -bimodule. We introduce a transpose ${Tr}_{c} M$ of an $R$ -module $M$ with respect to $C$ which unifies the Auslander transpose and Huang’s transpose, see Z. Y. Huang, On a generalization of the Auslander-Bridger transpose, Comm. Algebra 27 (1999), 5791–5812, in the two-sided Noetherian setting, and use ${Tr}_{c} M$ to develop further the generalized Gorenstein dimension with respect to $C$ . Especially, we generalize the Auslander-Bridger formula to the generalized...

A Note on the Structure of Injective Diagrams.

Michael Höppner (1983)

Manuscripta mathematica

A short proof of Krull's intersection theorem

A. Caruth (1993)

Colloquium Mathematicae

Actions of Hopf algebras on fully bounded Noetherian rings.

Guédénon, Thomas (2001)

Beiträge zur Algebra und Geometrie

Actions of Hopf algebras on pro-semisimple noetherian algebras and their invariants

Andrzej Tyc (2001)

Colloquium Mathematicae

Let H be a Hopf algebra over a field k such that every finite-dimensional (left) H-module is semisimple. We give a counterpart of the first fundamental theorem of the classical invariant theory for locally finite, finitely generated (commutative) H-module algebras, and for local, complete H-module algebras. Also, we prove that if H acts on the k-algebra A = k[[X₁,...,Xₙ]] in such a way that the unique maximal ideal in A is invariant, then the algebra of invariants $A^{H}$ is a noetherian Cohen-Macaulay...

Amalgams of Weyl algebras and the ... (V, ...) conjecture.

J.C. McConnell (1988)

Inventiones mathematicae

Associated prime ideals of skew polynomial rings.

Bhat, V.K. (2008)

Beiträge zur Algebra und Geometrie

Central extensions of three dimensional Artin-Schelter regular algebras.

Lieven Le Bruyn, M. Van den Bergh (1996)

Mathematische Zeitschrift

Characterizing rings by their modules

Patrick. F. Smith, Dinh Van Huynh (1990)

Banach Center Publications

Cohomology of Bimodules Over Enveloping Algebras.

Kenneth A. Brown, Thierry Levasseur (1985)

Mathematische Zeitschrift

Differentially trivial left Noetherian rings

O. D. Artemovych (1999)

Commentationes Mathematicae Universitatis Carolinae

We characterize left Noetherian rings which have only trivial derivations.

Differentially trivial Noetherian semiperfect rings.

Artemovych, O.D. (2002)

Mathematica Pannonica

Dimension homologique de modules simples

Malliavin, Marie-Paule (1983/1984)

Portugaliae mathematica

Division dans l'anneau des séries formelles à croissance contrôlée. Applications

Augustin Mouze (2001)

Studia Mathematica

We consider subrings A of the ring of formal power series. They are defined by growth conditions on coefficients such as, for instance, Gevrey conditions. We prove a Weierstrass-Hironaka division theorem for such subrings. Moreover, given an ideal ℐ of A and a series f in A we prove the existence in A of a unique remainder r modulo ℐ. As a consequence, we get a new proof of the noetherianity of A.

Currently displaying 1 – 20 of 73