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A domain R is called an absolutely S-domain (for short, AS-domain) if each domain T such that R ⊆ T ⊆ qf(R) is an S-domain. We show that R is an AS-domain if and only if for each valuation overring V of R and each height one prime ideal q of V, the extension R/(q ∩ R) ⊆ V/q is algebraic. A Noetherian domain R is an AS-domain if and only if dim (R) ≤ 1. In Section 2, we study a class of R-subalgebras of R[X] which share many spectral properties with the polynomial ring R[X] and which we call pseudo-polynomial...

Addendum to Polynomial rings over Jacobson-Hilbert rings.

Carl Faith (1990)

Publicacions Matemàtiques

In the article appeared in this same journal, vol. 33, 1 (1989) pp. 85-97, some statements in the proof of Example 3.4B got scrambled.

Algebraic closure of modules.

A.M. Ostrowski (1977)

Journal für die reine und angewandte Mathematik

Algébricité des fonctions méromorphes prenant certaines valeurs algébriques

Gérard Rauzy (1968)

Bulletin de la Société Mathématique de France

An algebraic construction of the generic singularities of Boardman-Thom

Kenneth Mount, Orlando E. Villamayor (1974)

Publications Mathématiques de l'IHÉS

An algorithm to compute the kernel of a derivation up to a certain degree

Stefan Maubach (2001)

Annales Polonici Mathematici

An algorithm is described which computes generators of the kernel of derivations on k[X₁,...,Xₙ] up to a previously given bound. For w-homogeneous derivations it is shown that if the algorithm computes a generating set for the kernel then this set is minimal.

An Application of Jonsson Modules to Some Questions Concerning Proper Subrings.

R. Gilmer, W. Heinzer (1992)

Mathematica Scandinavica

An application of modules of generalized fractions to grades of ideals and Gorenstein rings

H. Zakeri (1994)

Colloquium Mathematicae

An Effective Approach to Keller's Jacobian Conjecture.

Ludwik M. Druzkowski (1983)

Mathematische Annalen

An elementary proof of the Briançon-Skoda theorem

Jacob Sznajdman (2010)

Annales de la faculté des sciences de Toulouse Mathématiques

We give an elementary proof of the Briançon-Skoda theorem. The theorem gives a criterionfor when a function $φ$ belongs to an ideal $I$ of the ring of germs of analytic functions at $0 \in ℂ^{n}$ ; more precisely, the ideal membership is obtained if a function associated with $φ$ and $I$ is locally square integrable. If $I$ can be generated by $m$ elements,it follows in particular that $\bar{I^{min (m, n)}} \subset I$ , where $\bar{J}$ denotes the integral closure of an ideal $J$ .

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A subspace of $S p e c (A)$ and its connexions with the maximal ring of quotients

A two-dimensional domain whose integral closure is not t-linked.

Abelsche Galoiserweiterungen von R[X].

Abhyankar-Moh property and unique affine embeddings.

Absolutely S-domains and pseudo-polynomial rings

Addendum to Polynomial rings over Jacobson-Hilbert rings.

Algebraic closure of modules.

Algébricité des fonctions méromorphes prenant certaines valeurs algébriques

An algebraic construction of the generic singularities of Boardman-Thom

An algorithm to compute the kernel of a derivation up to a certain degree

An Application of Jonsson Modules to Some Questions Concerning Proper Subrings.

An application of modules of generalized fractions to grades of ideals and Gorenstein rings

An Effective Approach to Keller's Jacobian Conjecture.

An elementary proof of the Briançon-Skoda theorem

An extension to fields of positive characteristic of Mather's construction of the Thom-Boardman sequence

Anelli regolari separabilmente chiusi

Anisotropic resultant. Complements and applications. (Résultant anisotrope. Compléments et applications.)

Anneau des entiers d'une extension galoisienne considéré comme module sur l'algèbre du groupe de Galois

Anneaux de Goldman

Anneaux de 'polynômes à valeurs entières' et anneaux de Fatou

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