The EA-Dimension of a Commutative Ring

ISRN Algebra ◽

10.1155/2013/293207 ◽

2013 ◽

Vol 2013 ◽

pp. 1-6

Author(s):

Mosbah Eljeri

Keyword(s):

Commutative Ring ◽

Upper Bound ◽

Zero Divisors ◽

A Chain

An elementary annihilator of a ring A is an annihilator that has the form (0:a)A; a∈R∖(0). We define the elementary annihilator dimension of the ring A, denoted by EAdim(A), to be the upper bound of the set of all integers n such that there is a chain (0:a0)⊂⋯⊂(0:an) of annihilators of A. We use this dimension to characterize some zero-divisors graphs.

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Extension of Endomorphisms of the Subsemigroup GE 2 + (R) to Endomorphisms of GE 2 + (R[x]), Where R is a Partially-Ordered Commutative Ring Without Zero Divisors

Journal of Mathematical Sciences ◽

10.1007/s10958-015-2348-y ◽

2015 ◽

Vol 206 (6) ◽

pp. 711-733

Author(s):

O. I. Tsarkov

Keyword(s):

Commutative Ring ◽

Partially Ordered ◽

Zero Divisors

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On the explosion of chain-thermal reactions

The Journal of the Australian Mathematical Society Series B Applied Mathematics ◽

10.1017/s0334270000003672 ◽

1982 ◽

Vol 24 (2) ◽

pp. 194-202 ◽

Cited By ~ 8

Author(s):

R. O. Ayeni

Keyword(s):

Activation Energy ◽

Asymptotic Analysis ◽

Upper Bound ◽

Homogeneous Model ◽

Chain Reaction ◽

Isothermal Reaction ◽

Thermal Reactions ◽

Spatially Homogeneous ◽

Branched Chain ◽

A Chain

AbstractA chain reaction of oxygen (reactant) and hydrogen (active intermediary) with mtrosyl chloride (sensitizer) as a catalyst may be modelled mathematically as a non-isothermal reaction. In this paper we present an asymptotic analysis of a spatially homogeneous model of a non-isothermal branched-chain reaction. Of particular interest is the so-called explosion time and we provide an upper bound for it as a function of the activation energy which can vary over all positive values. We also establish a bound on the temperature when the activation energy is finite.

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RINGS: Almost a ring, semiring, zero, integral domain

10.31219/osf.io/bzugr ◽

2021 ◽

Author(s):

Matheus Pereira Lobo

Keyword(s):

Knowledge Base ◽

Commutative Ring ◽

Integral Domain ◽

White Paper ◽

Zero Divisors ◽

Domain Integral ◽

Zero Integral

RING, commutative ring, almost a ring, semiring, zero ring, zero property, zero divisors, domain, integral domain, and their underlying definitions are presented in this white paper (knowledge base).

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Invariant Factors Under Rank One Perturbations

Canadian Journal of Mathematics ◽

10.4153/cjm-1980-018-9 ◽

1980 ◽

Vol 32 (1) ◽

pp. 240-245 ◽

Cited By ~ 21

Author(s):

Robert C. Thompson

Keyword(s):

Commutative Ring ◽

Principal Ideal ◽

Matrix Multiplication ◽

Diagonal Form ◽

Principal Ideal Domain ◽

Ideal Domain ◽

Zero Divisors ◽

Rank One ◽

Invariant Factors

Let R be a principal ideal domain, i.e., a commutative ring without zero divisors in which every ideal is principal. The invariant factors of a matrix A with entries in R are the diagonal elements when A is converted to a diagonal form D = UAV, where U, V have entries in R and are unimodular (invertible over R), and the diagonal entries d1 …, dn of D form a divisibility chain: d1|d2| … |dn. Very little has been proved about how invariant factors may change when matrices are added. This is in contrast to the corresponding question for matrix multiplication, where much information is now available [6].

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Unique factorization in polynomial rings with zero divisors

Journal of Algebra and Its Applications ◽

10.1142/s0219498821501139 ◽

2020 ◽

pp. 2150113 ◽

Cited By ~ 1

Author(s):

D. D. Anderson ◽

Ranthony A. C. Edmonds

Keyword(s):

Commutative Ring ◽

Polynomial Ring ◽

Commutative Rings ◽

Polynomial Rings ◽

Unique Factorization ◽

Factorization Property ◽

Zero Divisors ◽

Unique Factorization Domain

Given a certain factorization property of a ring [Formula: see text], we can ask if this property extends to the polynomial ring over [Formula: see text] or vice versa. For example, it is well known that [Formula: see text] is a unique factorization domain if and only if [Formula: see text] is a unique factorization domain. If [Formula: see text] is not a domain, this is no longer true. In this paper, we survey unique factorization in commutative rings with zero divisors, and characterize when a polynomial ring over an arbitrary commutative ring has unique factorization.

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Modules with annihilation property

Journal of Algebra and Its Applications ◽

10.1142/s0219498821501267 ◽

2020 ◽

pp. 2150126

Author(s):

Rasul Mohammadi ◽

Ahmad Moussavi ◽

Masoome Zahiri

Keyword(s):

Commutative Ring ◽

Associative Ring ◽

Zero Divisor ◽

Commutative Rings ◽

Finitely Generated ◽

Ideal Formula ◽

Ordered Monoid ◽

Zero Divisors ◽

The Right ◽

Totally Ordered Monoid

Let [Formula: see text] be an associative ring with identity. A right [Formula: see text]-module [Formula: see text] is said to have Property ([Formula: see text]), if each finitely generated ideal [Formula: see text] has a nonzero annihilator in [Formula: see text]. Evans [Zero divisors in Noetherian-like rings, Trans. Amer. Math. Soc. 155(2) (1971) 505–512.] proved that, over a commutative ring, zero-divisor modules have Property ([Formula: see text]). We study and construct various classes of modules with Property ([Formula: see text]). Following Anderson and Chun [McCoy modules and related modules over commutative rings, Comm. Algebra 45(6) (2017) 2593–2601.], we introduce [Formula: see text]-dual McCoy modules and show that, for every strictly totally ordered monoid [Formula: see text], faithful symmetric modules are [Formula: see text]-dual McCoy. We then use this notion to give a characterization for modules with Property ([Formula: see text]). For a faithful symmetric right [Formula: see text]-module [Formula: see text] and a strictly totally ordered monoid [Formula: see text], it is proved that the right [Formula: see text]-module [Formula: see text] is primal if and only if [Formula: see text] is primal with Property ([Formula: see text]).

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Associate class graph of zero-divisors of a commutative ring

Journal of Algebra and Its Applications ◽

10.1142/s0219498820501558 ◽

2019 ◽

Vol 19 (08) ◽

pp. 2050155

Author(s):

Gaohua Tang ◽

Guangke Lin ◽

Yansheng Wu

Keyword(s):

Commutative Ring ◽

Chromatic Number ◽

Zero Divisor ◽

New Class ◽

Associate Class ◽

Zero Divisor Graph ◽

Zero Divisors ◽

Class Graph

In this paper, we introduce the concept of the associate class graph of zero-divisors of a commutative ring [Formula: see text], denoted by [Formula: see text]. Some properties of [Formula: see text], including the diameter, the connectivity and the girth are investigated. Utilizing this graph, we present a new class of counterexamples of Beck’s conjecture on the chromatic number of the zero-divisor graph of a commutative ring.

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Cohomological operators on quotients by exact zero divisors

Journal of Algebra and Its Applications ◽

10.1142/s0219498822500165 ◽

2020 ◽

pp. 2250016

Author(s):

Andrew Windle

Keyword(s):

Commutative Ring ◽

Zero Divisors

Let [Formula: see text] be a commutative ring, [Formula: see text] a pair of exact zero divisors, and [Formula: see text]. Let [Formula: see text] be a complex of free [Formula: see text]-modules. In this paper we explicitly compute cohomological operators of [Formula: see text] over [Formula: see text] by constructing endomorphisms of [Formula: see text]. We consider some properties of these cohomological operators, as well as provide an example in which these cohomological operators act non-trivially.

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When Is the Complement of the Zero-Divisor Graph of a Commutative Ring Complemented?

ISRN Algebra ◽

10.5402/2012/282054 ◽

2012 ◽

Vol 2012 ◽

pp. 1-13 ◽

Cited By ~ 1

Author(s):

S. Visweswaran

Keyword(s):

Commutative Ring ◽

Zero Divisor ◽

Zero Divisor Graph ◽

Zero Divisors

Let be a commutative ring with identity which has at least two nonzero zero-divisors. Suppose that the complement of the zero-divisor graph of has at least one edge. Under the above assumptions on , it is shown in this paper that the complement of the zero-divisor graph of is complemented if and only if is isomorphic to as rings. Moreover, if is not isomorphic to as rings, then, it is shown that in the complement of the zero-divisor graph of , either no vertex admits a complement or there are exactly two vertices which admit a complement.

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Finite commutative ring with genus two essential graph

Journal of Algebra and Its Applications ◽

10.1142/s0219498818501219 ◽

2018 ◽

Vol 17 (07) ◽

pp. 1850121

Author(s):

K. Selvakumar ◽

M. Subajini ◽

M. J. Nikmehr

Keyword(s):

Commutative Ring ◽

Commutative Rings ◽

Zero Divisors ◽

Essential Ideal ◽

Vertex Set ◽

Finite Commutative Ring ◽

Genus Two ◽

Finite Commutative Rings

Let [Formula: see text] be a commutative ring with identity and let [Formula: see text] be the set of zero-divisors of [Formula: see text]. The essential graph of [Formula: see text] is defined as the graph [Formula: see text] with the vertex set [Formula: see text] and two distinct vertices [Formula: see text] and [Formula: see text] are adjacent if and only if [Formula: see text] is an essential ideal. In this paper, we classify all finite commutative rings with identity for which the genus of [Formula: see text] is two.

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