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Given a convex algebra ∧0 in the tame finite-dimensional basic algebra ∧, over an algebraically closed field, we describe a special type of restriction of the generic ∧-modules.

On restrictions of indecomposables of tame algebras

R. Bautista, E. Pérez, L. Salmerón (2011)

Colloquium Mathematicae

We continue the study of ditalgebras, an acronym for "differential tensor algebras", and of their categories of modules. We examine extension/restriction interactions between module categories over a ditalgebra and a proper subditalgebra. As an application, we prove a result on representations of finite-dimensional tame algebras Λ over an algebraically closed field, which gives information on the extension/restriction interaction between module categories of some special algebras Λ₀, called convex...

On right ideals and derivations in prime rings with Engel condition

Basudeb Dhara, Deepankar Das (2013)

Matematički Vesnik

On rings all of whose modules are retractable

Şule Ecevit, Muhammet Tamer Koşan (2009)

Archivum Mathematicum

Let $R$ be a ring. A right $R$ -module $M$ is said to be retractable if $𝕋 {H o m}_{R} (M, N) \neq 0$ whenever $N$ is a non-zero submodule of $M$ . The goal of this article is to investigate a ring $R$ for which every right R-module is retractable. Such a ring will be called right mod-retractable. We proved that $(1)$ The ring $\prod_{i \in ℐ} R_{i}$ is right mod-retractable if and only if each $R_{i}$ is a right mod-retractable ring for each $i \in ℐ$ , where $ℐ$ is an arbitrary finite set. $(2)$ If $R [x]$ is a mod-retractable ring then $R$ is a mod-retractable ring.

On rings close to regular and $p$ -injectivity

Roger Yue Chi Ming (2006)

Commentationes Mathematicae Universitatis Carolinae

The following results are proved for a ring $A$ : (1) If $A$ is a fully right idempotent ring having a classical left quotient ring $Q$ which is right quasi-duo, then $Q$ is a strongly regular ring; (2) $A$ has a classical left quotient ring $Q$ which is a finite direct sum of division rings iff $A$ is a left $TC$ -ring having a reduced maximal right ideal and satisfying the maximum condition on left annihilators; (3) Let $A$ have the following properties: (a) each maximal left ideal of $A$ is either a two-sided ideal...

On rings satisfying certain polynomial identities.

Maurer, I.Gy., Szigeti, J. (1990)

Mathematica Pannonica

On rings whose centers are Galois extensions

Szeto, George, Ma, Linjun (1988)

Portugaliae mathematica

On rings whose flat modules form a Grothendieck category

J. Garcia, D. Simson (1997)

Colloquium Mathematicae

On rings with a unique proper essential right ideal

O. A. S. Karamzadeh, M. Motamedi, S. M. Shahrtash (2004)

Fundamenta Mathematicae

Right ue-rings (rings with the property of the title, i.e., with the maximality of the right socle) are investigated. It is shown that a semiprime ring R is a right ue-ring if and only if R is a regular V-ring with the socle being a maximal right ideal, and if and only if the intrinsic topology of R is non-discrete Hausdorff and dense proper right ideals are semisimple. It is proved that if R is a right self-injective right ue-ring (local right ue-ring), then R is never semiprime and is Artin semisimple...

On Rings with Polynomial Identity xn-x=0

Veselin Perić (1983)

Publications de l'Institut Mathématique

On rings with prime centers.

Abu-Khuzam, Hazar, Yaqub, Adil (1994)

International Journal of Mathematics and Mathematical Sciences

On rings with zero divisors. Strong $V$ -groups

Thomas N. Vougiouklis (1990)

Commentationes Mathematicae Universitatis Carolinae

On rings with zero total.

Beidar, K.I. (1997)

Beiträge zur Algebra und Geometrie

On Roth's pseudo equivalence over rings.

Hartwig, R.E., Patricio, Pedro (2007)

ELA. The Electronic Journal of Linear Algebra [electronic only]

On $S$ -Noetherian rings

Zhongkui Liu (2007)

Archivum Mathematicum

Let $R$ be a commutative ring and $S \subseteq R$ a given multiplicative set. Let $(M, \leq)$ be a strictly ordered monoid satisfying the condition that $0 \leq m$ for every $m \in M$ . Then it is shown, under some additional conditions, that the generalized power series ring $[[R^{M, \leq}]]$ is $S$ -Noetherian if and only if $R$ is $S$ -Noetherian and $M$ is finitely generated.

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