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相关论文: Factoring Ideals in Pr\"ufer Domains

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Let $\ast$ be a star operation on an integral domain $D$. Let $\f(D)$ be the set of all nonzero finitely generated fractional ideals of $D$. Call $D$ a $\ast$--Pr\"ufer (respectively, $(\ast, v)$--Pr\"ufer) domain if $(FF^{-1})^{\ast}=D$…

交换代数 · 数学 2008-09-18 D. D. Anderson , David F. Anderson , Marco Fontana , Muhammad Zafrullah

We consider the lattice-ordered groups Inv$(R)$ and Div$(R)$ of invertible and divisorial fractional ideals of a completely integrally closed Pr\"ufer domain. We prove that Div$(R)$ is the completion of the group Inv$(R)$, and we show there…

交换代数 · 数学 2016-05-04 Olivier A. Heubo-Kwegna , Bruce Olberding , Andreas Reinhart

Let $F$ be a field, $p$ a prime number, $X$ an indeterminate over $F$, $D_n =F[X^{\frac{1}{p^n}}, X^{-\frac{1}{p^n}}]$ for each integer $n \geq 0$ and $D = \bigcup\limits_{n\in\mathbb{N}_0}D_n.$ Then $D$ is a one-dimensional B{\'e}zout…

交换代数 · 数学 2026-05-19 Gyu Whan Chang , Hyun Seung Choi

Ideals in Leavitt path algebras have been shown to share many properties with those of integral domains. Since studying factorizations of ideals in integral domains into special types of ideals (particularly, prime, prime-power, primary,…

环与代数 · 数学 2020-09-18 Gene Abrams , Zachary Mesyan , Kulumani M. Rangaswamy

Let $D$ be a principal ideal domain and $R(D) = \{\begin{pmatrix} a & b 0 & a \end{pmatrix} \mid a, b \in D\}$ be its self-idealization. It is known that $R(D)$ is a commutative noetherian ring with identity, and hence $R(D)$ is atomic…

交换代数 · 数学 2013-11-21 Gyu Whan Chang , Daniel Smertnig

Let $F$ be a field, let $D$ be a subring of $F$ and let $Z$ be an irreducible subspace of the space of all valuation rings between $D$ and $F$ that have quotient field $F$. Then $Z$ is a locally ringed space whose ring of global sections is…

交换代数 · 数学 2016-01-20 Bruce Olberding

Let $R$ be a commutative ring with identity. The structure theorem says that $R$ is a PIR (resp., UFR, general ZPI-ring, $\pi$-ring) if and only if $R$ is a finite direct product of PIDs (resp., UFDs, Dedekind domains, $\pi$-domains) and…

交换代数 · 数学 2023-03-13 Gyu Whan Chang , Jun Seok Oh

We study the question up to which power an irreducible integer-valued polynomial that is not absolutely irreducible can factor uniquely. For example, for integer-valued polynomials over principal ideal domains with square-free denominator,…

交换代数 · 数学 2025-07-15 Sarah Nakato , Roswitha Rissner

A ring has bounded factorizations if every cancellative nonunit $a \in R$ can be written as a product of atoms and there is a bound $\lambda(a)$ on the lengths of such factorizations. The bounded factorization property is one of the most…

环与代数 · 数学 2026-01-13 Jason P. Bell , Ken Brown , Zahra Nazemian , Daniel Smertnig

Let $T$ be a complete local (Noetherian) ring. For each $i \in \mathbb{N}$, let $C_i$ be a nonempty countable set of nonmaximal pairwise incomparable prime ideals of $T$, and suppose that if $i \neq j$, then either $C_i = C_j$ or no element…

交换代数 · 数学 2023-11-28 David Baron , Ammar Eltigani , S. Loepp , AnaMaria Perez , M. Teplitskiy

Let $R=\bigoplus_{\alpha\in\Gamma}R_{\alpha}$ be a graded integral domain and $\star$ be a semistar operation on $R$. For $a\in R$, denote by $C(a)$ the ideal of $R$ generated by homogeneous components of $a$ and…

交换代数 · 数学 2017-08-01 Parviz Sahandi

Let R* be an ideal-adic completion of a Noetherian integral domain R and let L be a subfield of the total quotient ring of R* such that L contains R. Let A denote the intersection of L with R*. The integral domain A sometimes inherits nice…

交换代数 · 数学 2014-04-15 William Heinzer , Christel Rotthaus , Sylvia Wiegand

For a submodule $N$ of an $R$-module $M$, a unique product of prime ideals in $R$ is assigned, which is called the generalized prime ideal factorization of $N$ in $M$, and denoted as ${\mathcal{P}}_M(N)$. But for a product of prime ideals…

交换代数 · 数学 2025-11-10 K. R. Thulasi , T. Duraivel , S. Mangayarcarassy

For a proper submodule $N$ of a finitely generated module $M$ over a Noetherian ring, the product of prime ideals which occur in a regular prime extension filtration of $M$ over $N$ is defined as its generalized prime ideal factorization in…

交换代数 · 数学 2025-11-10 K. R. Thulasi , T. Duraivel , S. Mangayarcarassy

Let $A$ be an integral domain. We study new conditions on families of integral ideals of $A$ in order to get that $A$ is of $t$-finite character (i.e., each nonzero element of $A$ is contained in finitely many $t$-maximal ideals). We also…

交换代数 · 数学 2010-01-29 Carmelo Antonio Finocchiaro , Giampaolo Picozza , Francesca Tartarone

Let $G$ be a one-dimensional $\ell$-subgroup of the group $\mathcal{F}(X,\mathbb{Z})$ of integer-valued functions on a set $X$. We show that $G$ is free under some hypothesis on the spectrum of $G$ and on its quotient groups at the prime…

交换代数 · 数学 2026-03-18 Dario Spirito

We study some factorization properties of the idealization $R \mathop{(\! + \! )} M$ of a module $M$ in a commutative ring $R$ which is not necessarily a domain. We show that $R \mathop{(\! + \! )} M$ is ACCP if and only if $R$ is ACCP and…

交换代数 · 数学 2024-04-05 Sina Eftekhari , Sayyed Heidar Jafari , Mahdi Reza Khorsandi

Rings of integer-valued polynomials are known to be atomic, non-factorial rings furnishing examples for both irreducible elements for which all powers factor uniquely (\emph{absolutely irreducibles}) and irreducible elements where some…

交换代数 · 数学 2023-07-18 Moritz Hiebler , Sarah Nakato , Roswitha Rissner

An integral domain is atomic if every nonzero nonunit factors into irreducibles. Let $R$ be an integral domain. We say that $R$ is a bounded factorization domain if it is atomic and for every nonzero nonunit $x \in R$, there is a positive…

交换代数 · 数学 2020-10-07 David F. Anderson , Felix Gotti

In this paper we exhibit an example of a three-dimensional regular local domain (A, n) having a height-two prime ideal P with the property that the extension PA^ of P to the n-adic completion A^ of A is not integrally closed. We use a…

交换代数 · 数学 2007-05-23 William Heinzer , Christel Rotthaus , Sylvia Wiegand