On λ-extensions of commutative rings
From MaRDI portal
Publication:4638597
DOI10.1142/S0219498818500639zbMath1395.13006OpenAlexW2598836558MaRDI QIDQ4638597
Publication date: 27 April 2018
Published in: Journal of Algebra and Its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0219498818500639
ring of invariantsnormal pair of ringsintegrally closed rings\(\lambda\)-extension of ringsFIP and FCP extensions
Integral closure of commutative rings and ideals (13B22) Actions of groups on commutative rings; invariant theory (13A50) Valuations and their generalizations for commutative rings (13A18) Commutative ring extensions and related topics (13B99)
Related Items (6)
The number of intermediate rings in FIP extension of integral domains ⋮ Δ-Extension of rings and invariance properties of ring extension under group action ⋮ Maximal non valuation domains in an integral domain ⋮ On strongly affine extensions of commutative rings ⋮ Maximal non $\lambda$-subrings ⋮ Pairs of rings invariant under group action
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- On finiteness of chains of intermediate rings
- Intermediary rings in normal pairs
- Some finiteness chain conditions on the set of intermediate rings
- The S-transform and the ideal transform
- A characterization of Prüfer domains in terms of polynomials
- Residually algebraic pairs of rings
- \(\Delta\)-rings
- Characterizing the ring extensions that satisfy FIP or FCP
- Counting intermediate rings in normal pairs
- Homomorphismes minimaux d'anneaux
- FIP AND FCP products of ring morphisms
- Ring extensions with some finiteness conditions on the set of intermediate rings
- The Singly Generated Unital Rings with Only Finitely Many Unital Subrings
- A CHARACTERIZATION OF THE COMMUTATIVE UNITAL RINGS WITH ONLY FINITELY MANY UNITAL SUBRINGS
- Local Minimal Overrings
- A lower bound for the number of intermediary rings
- Minimal Overrings of an Integrally Closed Domain
- Some finiteness conditions on the set of overrings of an integral domain
- On the FIP Property for Extensions of Commutative Rings
This page was built for publication: On λ-extensions of commutative rings
