ON MAXIMAL NON-ACCP SUBRINGS
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Publication:3502811
DOI10.1142/S0219498807002545zbMath1154.13007MaRDI QIDQ3502811
David E. Dobbs, Ahmed Ayache, Othman Echi
Publication date: 20 May 2008
Published in: Journal of Algebra and Its Applications (Search for Journal in Brave)
valuation domainintegral domainpullbackoverringDVRminimal ring extensionatomic domainresidually algebraic pairmaximal non-ACCP subring
Integral domains (13G05) Ideals and multiplicative ideal theory in commutative rings (13A15) Integral dependence in commutative rings; going up, going down (13B21) Dedekind, Prüfer, Krull and Mori rings and their generalizations (13F05) Other special types of modules and ideals in commutative rings (13C13) Commutative ring extensions and related topics (13B99)
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Cites Work
- Unnamed Item
- Factorization in integral domains
- A classification of the minimal ring extensions of an integral domain
- A classification of the minimal ring extensions of certain commutative rings
- Topologically defined classes of commutative rings
- Divided rings and going-down
- Pseudo-valuation domains
- Factorization in integral domains. III
- Residually algebraic pairs of rings
- Maximal non-Jaffard subrings of a field
- Homomorphismes minimaux d'anneaux
- Some finiteness and divisibility conditions on the proper overrings of an integral domain
- Every Commutative Ring Has a Minimal Ring Extension
- On Inc-Extensions and Polynomials with Unit Content
- On minimal overrings of a noetherian domain
- Pairs of Rings with the Same Prime Ideals
- Domains whose overrings satisfy accp
