Add to ORKGGiven an arbitrary spectral space X, we endow it with its specialization order <= and we study the interplay between suprema of subsets of (X, <=) and the constructible topology. More precisely, we examine when the supremum of a set Y subset of X exists and belongs to the constructible closure of Y. We apply such results to algebraic lattices of sets and to closure operations on them, proving density properties of some distinguished spaces of rings and ideals. Furthermore, we provide topological characterizations of some class of domains in terms of topological properties of their ideals
A stable homology theory is defined for completely distributive CSL algebras in terms of the point-n...
Let K be a field, and let A be a subring of K. We consider properties and applications of a compact,...
A specialization semilattice is a structure which can be embedded into (P(X),∪,⊑), where X is a topo...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
The study of the spectral theory of primally generated (and hence distributive) continuous lattices ...
Given an arbitrary spectral space X, we consider the set X(X) of all nonempty subsets of X that are ...
International audienceA compact topological space X is spectral if it is sober (i.e., every irreduci...
Offers a comprehensive presentation of spectral spaces focussing on their topology and close connect...
AbstractLet R be a commutative ring with identity. We denote by Spec(R) the set of prime ideals of R...
AbstractThe purpose of this expository note is to draw together and to interrelate a variety of char...
AbstractA necessary and sufficient condition is given for the compactness of the topology generated ...
Ordered vector spaces are examined from the point of view of Bishop’s constructive mathematics, whic...
"Appendix": 2 l. at end.On the theorem of Krein-Milman.--A representation theorem for vector lattice...
In this paper various properties of the spectrum (i.e. the set of prime elements endowed with the hu...
We give several new ways of constructing spectral spaces starting with objects in abelian categories...
A stable homology theory is defined for completely distributive CSL algebras in terms of the point-n...
Let K be a field, and let A be a subring of K. We consider properties and applications of a compact,...
A specialization semilattice is a structure which can be embedded into (P(X),∪,⊑), where X is a topo...
We consider properties and applications of a compact, Hausdorff topology called the "ultrafilter top...
The study of the spectral theory of primally generated (and hence distributive) continuous lattices ...
Given an arbitrary spectral space X, we consider the set X(X) of all nonempty subsets of X that are ...
International audienceA compact topological space X is spectral if it is sober (i.e., every irreduci...
Offers a comprehensive presentation of spectral spaces focussing on their topology and close connect...
AbstractLet R be a commutative ring with identity. We denote by Spec(R) the set of prime ideals of R...
AbstractThe purpose of this expository note is to draw together and to interrelate a variety of char...
AbstractA necessary and sufficient condition is given for the compactness of the topology generated ...
Ordered vector spaces are examined from the point of view of Bishop’s constructive mathematics, whic...
"Appendix": 2 l. at end.On the theorem of Krein-Milman.--A representation theorem for vector lattice...
In this paper various properties of the spectrum (i.e. the set of prime elements endowed with the hu...
We give several new ways of constructing spectral spaces starting with objects in abelian categories...
A stable homology theory is defined for completely distributive CSL algebras in terms of the point-n...
Let K be a field, and let A be a subring of K. We consider properties and applications of a compact,...
A specialization semilattice is a structure which can be embedded into (P(X),∪,⊑), where X is a topo...