Add to ORKGAbstract We survey and extend recent work on integrally closed overrings of two-dimensional Noetherian domains, where such overrings are viewed as intersections of valuation overrings. Of particular interest are the cases where the domain can be represented uniquely by an irredundant intersection of valuation rings, and when the valuation rings can be chosen from a Noetherian subspace of the Zariski-Riemann space of valuation rings.
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
ABSTRACT. The three notes contain: a characterization of R(t) = R[t] •R[1/t] in the class of overrin...
We show that, given a chain 0 = P0 P1 Pn of prime ideals in a Noetherian domain R, there e...
AbstractLet D be a Noetherian domain of Krull dimension 2, and let H⊆R be integrally closed overring...
AbstractLet D be a two-dimensional Noetherian domain, let R be an overring of D, and let Σ and Γ be ...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
AbstractLet D be a Noetherian domain of Krull dimension 2, and let H⊆R be integrally closed overring...
AbstractLet D be a two-dimensional Noetherian domain, let R be an overring of D, and let Σ and Γ be ...
It is shown that the integral closure R\u27 of a local (Noetherian) domain R is equal to the interse...
Valuation rings occur in a wide variety of situations. In this paper we bring together many basic re...
We study the space of valuation overrings of Z[X] by ordering them using a constructive process. Th...
We study the space of valuation overrings of Z[X] by ordering them using a constructive process. Th...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
Greatest common divisor domains, Bezout domains, valuation rings, and Prüfer domains are studied. Ch...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
ABSTRACT. The three notes contain: a characterization of R(t) = R[t] •R[1/t] in the class of overrin...
We show that, given a chain 0 = P0 P1 Pn of prime ideals in a Noetherian domain R, there e...
AbstractLet D be a Noetherian domain of Krull dimension 2, and let H⊆R be integrally closed overring...
AbstractLet D be a two-dimensional Noetherian domain, let R be an overring of D, and let Σ and Γ be ...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
AbstractLet D be a Noetherian domain of Krull dimension 2, and let H⊆R be integrally closed overring...
AbstractLet D be a two-dimensional Noetherian domain, let R be an overring of D, and let Σ and Γ be ...
It is shown that the integral closure R\u27 of a local (Noetherian) domain R is equal to the interse...
Valuation rings occur in a wide variety of situations. In this paper we bring together many basic re...
We study the space of valuation overrings of Z[X] by ordering them using a constructive process. Th...
We study the space of valuation overrings of Z[X] by ordering them using a constructive process. Th...
AbstractFor a Noetherian domain R (altitude R < ∞) with quotient field F, an overring I(R) of R is d...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
Greatest common divisor domains, Bezout domains, valuation rings, and Prüfer domains are studied. Ch...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
ABSTRACT. The three notes contain: a characterization of R(t) = R[t] •R[1/t] in the class of overrin...
We show that, given a chain 0 = P0 P1 Pn of prime ideals in a Noetherian domain R, there e...