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Displaying 881 – 900 of 1097

Valuations and Semi-Valuations of Graded Domains.

David F. Anderson, Jack Ohm (1981)

Mathematische Annalen

Vector invariant ideals of abelian group algebras under the actions of the unitary groups and orthogonal groups

Lingli Zeng, Jizhu Nan (2016)

Czechoslovak Mathematical Journal

Let $F$ be a finite field of characteristic $p$ and $K$ a field which contains a primitive $p$ th root of unity and $char K \neq p$ . Suppose that a classical group $G$ acts on the $F$ -vector space $V$ . Then it can induce the actions on the vector space $V \oplus V$ and on the group algebra $K [V \oplus V]$ , respectively. In this paper we determine the structure of $G$ -invariant ideals of the group algebra $K [V \oplus V]$ , and establish the relationship between the invariant ideals of $K [V]$ and the vector invariant ideals of $K [V \oplus V]$ , if $G$ is a unitary group or orthogonal group....

Verallgemeinerte Fasersummen von unzerlegbaren Moduln.

Wolfgang Müller (1981)

Mathematische Annalen

Von Neumann regular rings and the Whitehead property of modules

Jan Trlifaj (1990)

Commentationes Mathematicae Universitatis Carolinae

Warfield Invariants in Abelian Group Algebras

Peter Danchev (2008)

Collectanea Mathematica

Warfield invariants in abelian group rings.

Peter V. Danchev (2005)

Extracta Mathematicae

Let R be a perfect commutative unital ring without zero divisors of char(R) = p and let G be a multiplicative abelian group. Then the Warfield p-invariants of the normed unit group V (RG) are computed only in terms of R and G. These cardinal-to-ordinal functions, combined with the Ulm-Kaplansky p-invariants, completely determine the structure of V (RG) whenever G is a Warfield p-mixed group.

Weak baer modules localized with respect to a torsion theory

Seog Hoon Rim, Mark L. Teply (1998)

Czechoslovak Mathematical Journal

Weak Baer modules over graded rings

Mark Teply, Blas Torrecillas (1998)

Colloquium Mathematicae

In [2], Fuchs and Viljoen introduced and classified the $B^{*}$ -modules for a valuation ring R: an R-module M is a $B^{*}$ -module if $E x t_{R}^{1} (M, X) = 0$ for each divisible module X and each torsion module X with bounded order. The concept of a $B^{*}$ -module was extended to the setting of a torsion theory over an associative ring in [14]. In the present paper, we use categorical methods to investigate the $B^{*}$ -modules for a group graded ring. Our most complete result (Theorem 4.10) characterizes $B^{*}$ -modules for a strongly graded ring R...

Weak dimensions and Gorenstein weak dimensions of group rings

Yueming Xiang (2021)

Czechoslovak Mathematical Journal

Let $K$ be a field, and let $G$ be a group. In the present paper, we investigate when the group ring $K [G]$ has finite weak dimension and finite Gorenstein weak dimension. We give some analogous versions of Serre’s theorem for the weak dimension and the Gorenstein weak dimension.

Weak incidence algebra and maximal ring of quotients.

Singh, Surjeet, Al-Thukair, Fawzi (2004)

International Journal of Mathematics and Mathematical Sciences

Weak Krull-Schmidt theorem

Ladislav Bican (1998)

Commentationes Mathematicae Universitatis Carolinae

Recently, A. Facchini [3] showed that the classical Krull-Schmidt theorem fails for serial modules of finite Goldie dimension and he proved a weak version of this theorem within this class. In this remark we shall build this theory axiomatically and then we apply the results obtained to a class of some modules that are torsionfree with respect to a given hereditary torsion theory. As a special case we obtain that the weak Krull-Schmidt theorem holds for the class of modules that are both uniform...

Weak Polynomial Identities for M1,1(E)

Di Vincenzo, Onofrio, La Scala, Roberto (2001)

Serdica Mathematical Journal

* Partially supported by Universita` di Bari: progetto “Strutture algebriche, geometriche e descrizione degli invarianti ad esse associate”.We compute the cocharacter sequence and generators of the ideal of the weak polynomial identities of the superalgebra M1,1 (E).

When is the category of flat modules abelian?

J. García, J. Martínez Hernández (1995)

Fundamenta Mathematicae

Let Fl(R) denote the category of flat right modules over an associative ring R. We find necessary and sufficient conditions for Fl(R) to be a Grothendieck category, in terms of properties of the ring R.

Whitehead Modules over Domains.

L. Fuchs, T. Becker, S. Shela (1989)

Forum mathematicum

Wreath products in modular group algebras of some finite 2-groups.

Konovalov, Alexander (2007)

Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]

Wreath products in the unit group of modular group algebras of 2-groups of maximal class.

Konovalov, Alexander B. (2001)

Acta Mathematica Academiae Paedagogicae Nyí regyháziensis. New Series [electronic only]

ZS-Metacyclic Groups and Their Endomorphism Near -Rings.

J.J. Malone, Gordon Mason (1994)

Monatshefte für Mathematik

Zur Theorie der Polynomringe.

Wilfried Nöbauer (1975)

Monatshefte für Mathematik

Λ-modules and holomorphic Lie algebroid connections

Pietro Tortella (2012)

Open Mathematics

Let X be a complex smooth projective variety, and G a locally free sheaf on X. We show that there is a one-to-one correspondence between pairs (Λ, Ξ), where Λ is a sheaf of almost polynomial filtered algebras over X satisfying Simpson’s axioms and $\equiv : G r Λ \to S y m •_{𝒪_{X}} 𝒢$ is an isomorphism, and pairs (L, Σ), where L is a holomorphic Lie algebroid structure on $𝒢$ and Σ is a class in F 1 H 2(L, ℂ), the first Hodge filtration piece of the second cohomology of L. As an application, we construct moduli spaces of semistable...

$τ$ -supplemented modules and $τ$ -weakly supplemented modules

Muhammet Tamer Koşan (2007)

Archivum Mathematicum

Given a hereditary torsion theory $τ = (𝕋, 𝔽)$ in Mod- $R$ , a module $M$ is called $τ$ -supplemented if every submodule $A$ of $M$ contains a direct summand $C$ of $M$ with $A / C$ $τ -$ torsion. A submodule $V$ of $M$ is called $τ$ -supplement of $U$ in $M$ if $U + V = M$ and $U \cap V \leq τ (V)$ and $M$ is $τ$ -weakly supplemented if every submodule...

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