Commutative ring theory proceedings of the Fès international conference
" Exploring commutative algebra's connections with and applications to topological algebra and algebraic geometry, Commutative Ring Theory covers the spectra of rings chain conditions, dimension theory, and Jaffard rings fiber products group rings, semigroup rings, and graded rings class g...
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| Formato: | Libro electrónico |
| Idioma: | Inglés |
| Publicado: |
Boca Raton, FL :
CRC Press
[1994]
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| Edición: | [First edition] |
| Colección: | Lecture notes in pure and applied mathematics ;
v. 153. |
| Materias: | |
| Ver en Biblioteca Universitat Ramon Llull: | https://discovery.url.edu/permalink/34CSUC_URL/1im36ta/alma991009757913206719 |
Tabla de Contenidos:
- Cover
- Half Title
- Title Page
- Copyright Page
- Preface
- Table of Contents
- Contributors
- 1: Seminormal Mori Domains
- 2: Maximality Properties in Numerical Semigroups, with Applications to One-Dimensional Analytically Irreducible Local Domains
- 3: The Graded and Tame Extensions
- 4: Ascending Chain Conditions and Associated Primes
- 5: Polynomials Whose Derivatives are Integer-Valued in Number Fields
- 6: Krull Dimension of Graded Algebras
- 7: Radices in Commutative Rings
- 8: The Generalized Samuel Numbers
- 9: Some Locally Trivial Star-Theoretic Properties of Integral Domains
- 10: The Altitude Formula
- 11: Absolutely Pure Modules and Locally Injective Modules
- 12: Krull and Valuative Dimensions of the A + XB[X] Rings
- 13: Divisorial Ideals and Class Groups of Mori Domains
- 14: T-Invertibility and Comparability
- 15: AF-Rings and Locally Jaffard Rings
- 16: Prime T-Ideals in R[ X]
- 17: A Characterization of Semi-Artinian Rings
- 18: The Ring of Finite Fractions
- 19: Graded Rings and Modules
- 20: Symbolic Powers, Rees Algebras and Applications
- 21: Soundable Subsets of a Spectrum and Depth
- 22: T - Closed Rings
- 23: Some Aspects of the Asymptotic Theory of Ideals. Generalization to Filtrations
- 24: Chain Conditions Arising from the Study of Non Finitely Generated Modules over Commutative Rings.
