Quotient Rings | ScienceGate

Centers of maximal quotient rings

Archiv der Mathematik ◽

10.1007/bf01190229 ◽

1988 ◽

Vol 50 (4) ◽

pp. 342-347 ◽

Cited By ~ 6

Author(s):

Pere Ara

Keyword(s):

Quotient Rings

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Quotient rings of Noetherian module finite rings

Proceedings of the American Mathematical Society ◽

10.1090/s0002-9939-1994-1198452-2 ◽

1994 ◽

Vol 121 (2) ◽

pp. 335-335 ◽

Cited By ~ 2

Author(s):

A. W. Chatters ◽

C. R. Hajarnavis

Keyword(s):

Finite Rings ◽

Noetherian Module ◽

Quotient Rings

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Intersections of quotient rings and Prüfer v-multiplication domains

Journal of Algebra and Its Applications ◽

10.1142/s0219498816501498 ◽

2016 ◽

Vol 15 (08) ◽

pp. 1650149 ◽

Cited By ~ 1

Author(s):

Said El Baghdadi ◽

Marco Fontana ◽

Muhammad Zafrullah

Keyword(s):

Integral Domain ◽

Algebraic Approach ◽

Quotient Field ◽

Topological Characterization ◽

Locally Finite ◽

Star Operation ◽

Star Operations ◽

Quotient Rings ◽

Special Case

Let [Formula: see text] be an integral domain with quotient field [Formula: see text]. Call an overring [Formula: see text] of [Formula: see text] a subring of [Formula: see text] containing [Formula: see text] as a subring. A family [Formula: see text] of overrings of [Formula: see text] is called a defining family of [Formula: see text], if [Formula: see text]. Call an overring [Formula: see text] a sublocalization of [Formula: see text], if [Formula: see text] has a defining family consisting of rings of fractions of [Formula: see text]. Sublocalizations and their intersections exhibit interesting examples of semistar or star operations [D. D. Anderson, Star operations induced by overrings, Comm. Algebra 16 (1988) 2535–2553]. We show as a consequence of our work that domains that are locally finite intersections of Prüfer [Formula: see text]-multiplication (respectively, Mori) sublocalizations turn out to be Prüfer [Formula: see text]-multiplication domains (PvMDs) (respectively, Mori); in particular, for the Mori domain case, we reobtain a special case of Théorème 1 of [J. Querré, Intersections d’anneaux intègers, J. Algebra 43 (1976) 55–60] and Proposition 3.2 of [N. Dessagnes, Intersections d’anneaux de Mori — exemples, Port. Math. 44 (1987) 379–392]. We also show that, more than the finite character of the defining family, it is the finite character of the star operation induced by the defining family that causes the interesting results. As a particular case of this theory, we provide a purely algebraic approach for characterizing P vMDs as a subclass of the class of essential domains (see also Theorem 2.4 of [C. A. Finocchiaro and F. Tartarone, On a topological characterization of Prüfer [Formula: see text]-multiplication domains among essential domains, preprint (2014), arXiv:1410.4037]).

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Hilbert functions of colored quotient rings and a generalization of the Clements–Lindström theorem

Journal of Algebraic Combinatorics ◽

10.1007/s10801-014-0571-0 ◽

2014 ◽

Vol 42 (1) ◽

pp. 1-23

Author(s):

Kai Fong Ernest Chong

Keyword(s):

Hilbert Functions ◽

Quotient Rings ◽

Lindström Theorem

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Maximal quotient rings of ring extensions

Pacific Journal of Mathematics ◽

10.2140/pjm.1976.62.489 ◽

1976 ◽

Vol 62 (2) ◽

pp. 489-496 ◽

Cited By ~ 7

Author(s):

Kenneth Louden

Keyword(s):

Ring Extensions ◽

Quotient Rings

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Faithful representations of Chevalley groups over quotient rings of non-Archimedean local fields

Groups Geometry and Dynamics ◽

10.4171/ggd/387 ◽

2017 ◽

Vol 11 (1) ◽

pp. 57-74 ◽

Cited By ~ 1

Author(s):

Mohammad Bardestani ◽

Camelia Karimianpour ◽

Keivan Mallahi-Karai ◽

Hadi Salmasian

Keyword(s):

Local Fields ◽

Chevalley Groups ◽

Quotient Rings

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Maximal quotient rings

Lecture Notes in Mathematics - Lectures on Injective Modules and Quotient Rings ◽

10.1007/bfb0074327 ◽

1967 ◽

pp. 64-75 ◽

Cited By ~ 2

Author(s):

Carl Faith

Keyword(s):

Quotient Rings

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Noetherian Subrings of Quotient Rings

Methods in Ring Theory ◽

10.1007/978-94-009-6369-6_26 ◽

1984 ◽

pp. 379-389

Author(s):

Ian M. Musson

Keyword(s):

Quotient Rings

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A Generalization of the Concept of a Ring of Quotients

Canadian Mathematical Bulletin ◽

10.4153/cmb-1971-093-6 ◽

1971 ◽

Vol 14 (4) ◽

pp. 517-529 ◽

Cited By ~ 5

Author(s):

John K. Luedeman

Keyword(s):

Left Ideal ◽

Quotient Ring ◽

Original Method ◽

Duke Math ◽

Injective Hull ◽

Direct Products ◽

Left Module ◽

Matrix Rings ◽

Ring Of Quotients ◽

Quotient Rings

AbstractSanderson (Canad. Math. Bull., 8 (1965), 505–513), considering a nonempty collection Σ of left ideals of a ring R, with unity, defined the concepts of “Σ-injective module” and “Σ-essential extension” for unital left modules. Letting Σ be an idempotent topologizing set (called a σ-set below) Σanderson proved the existence of a “Σ-injective hull” for any unital left module and constructed an Utumi Σ-quotient ring of R as the bicommutant of the Σ-injective hull of RR. In this paper, we extend the concepts of “Σinjective module”, “Σ-essentialextension”, and “Σ-injective hull” to modules over arbitrary rings. An overring Σ of a ring R is a Johnson (Utumi) left Σ-quotient ring of R if RR is Σ-essential (Σ-dense) in RS. The maximal Johnson and Utumi Σ-quotient rings of R are constructed similar to the original method of Johnson, and conditions are given to insure their equality. The maximal Utumi Σquotient ring U of R is shown to be the bicommutant of the Σ-injective hull of RR when R has unity. We also obtain a σ-set UΣ of left ideals of U, generated by Σ, and prove that Uis its own maximal Utumi UΣ-quotient ring. A Σ-singular left ideal ZΣ(R) of R is defined and U is shown to be UΣ-injective when Z Σ(R) = 0. The maximal Utumi Σ-quotient rings of matrix rings and direct products of rings are discussed, and the quotient rings of this paper are compared with these of Gabriel (Bull. Soc. Math. France, 90 (1962), 323–448) and Mewborn (Duke Math. J. 35 (1968), 575–580). Our results reduce to those of Johnson and Utumi when 1 ∊ R and Σ is taken to be the set of all left ideals of R.

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Semicritical Rings and the Quotient Problem

Canadian Mathematical Bulletin ◽

10.4153/cmb-1984-025-7 ◽

1984 ◽

Vol 27 (2) ◽

pp. 160-170

Author(s):

Karl A. Kosler

Keyword(s):

Quotient Ring ◽

Sufficient Conditions ◽

Necessary And Sufficient Conditions ◽

Prime Ideals ◽

Regular Elements ◽

The Right ◽

Minimal Prime ◽

Necessary And Sufficient ◽

Quotient Rings ◽

The Relationship

AbstractThe purpose of this paper is to examine the relationship between the quotient problem for right noetherian nonsingular rings and the quotient problem for semicritical rings. It is shown that a right noetherian nonsingular ring R has an artinian classical quotient ring iff certain semicritical factor rings R/Ki, i = 1,…,n, possess artinian classical quotient rings and regular elements in R/Ki lift to regular elements of R for all i. If R is a two sided noetherian nonsingular ring, then the existence of an artinian classical quotient ring is equivalent to each R/Ki possessing an artinian classical quotient ring and the right Krull primes of R consisting of minimal prime ideals. If R is also weakly right ideal invariant, then the former condition is redundant. Necessary and sufficient conditions are found for a nonsingular semicritical ring to have an artinian classical quotient ring.

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