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zbMath1127.13006MaRDI QIDQ3436775

Gabriel Picavet, Martine Picavet-L'Hermitte

Publication date: 11 May 2007

Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.

zbMATH Keywords

stable domain flat epimorphism crucial maximal ideal maximal subring minimal overring divisorial domain minimal morphism simple monomorphism totally divisorial

Mathematics Subject Classification ID

Morphisms of commutative rings (13B10) Integral domains (13G05)

Related Items (26)

On Finite Maximal Chains of Weak Baer Going-Down Rings ⋮ When is a fixed ring comparable to all overrings? ⋮ An answer to a question about maximal non-integrally closed subrings ⋮ A classification of the minimal ring extensions of certain commutative rings ⋮ The Loewy series of an FCP (distributive) ring extension ⋮ Unnamed Item ⋮ Boolean FIP ring extensions ⋮ Certain towers of ramified minimal ring extensions of commutative rings, II ⋮ Perinormality -- a generalization of Krull domains ⋮ Characterizing the ring extensions that satisfy FIP or FCP ⋮ On the nature and number of isomorphism classes of the minimal ring extensions of a finite commutative ring ⋮ WHEN IS THE INTEGRAL CLOSURE COMPARABLE TO ALL INTERMEDIATE RINGS ⋮ Commutative Rings with a Prescribed Number of Isomorphism Classes of Minimal Ring Extensions ⋮ Quasi-Prüfer Extensions of Rings ⋮ Certain towers of ramified minimal ring extensions of commutative rings ⋮ Étale extensions with finitely many subextensions ⋮ On maximal subalgebras ⋮ A minimal ring extension of a large finite local prime ring is probably ramified ⋮ THE FERRAND-OLIVIER CLASSIFICATION OF THE MINIMAL RING EXTENSIONS OF A FIELD: A PROOF AND A SURVEY OF ITS INFLUENCE ⋮ Ring extensions of length two ⋮ Characterizing finite fields via minimal ring extensions ⋮ The Space of Maximal Subrings of a Commutative Ring ⋮ When an extension of Nagata rings has only finitely many intermediate rings, each of those is a Nagata ring ⋮ Where Some Inert Minimal Ring Extensions of a Commutative Ring Come from ⋮ A note on the FIP property for extensions of commutative rings ⋮ A Zariski topology on integrally closed maximal subrings of a commutative ring

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