AbstractWe introduce the notion of infinitary preorder and use it to obtain a predicative presentation of sup-lattices by generators and relations. The method is uniform in that it extends in a modular way to obtain a presentation of quantales, as “sup-lattices on monoids”, by using the notion of pretopology.Our presentation is then applied to frames, the link with Johnstone’s presentation of frames is spelled out, and his theorem on freely generated frames becomes a special case of our results on quantales.The main motivation of this paper is to contribute to the development of formal topology. That is why all our definitions and proofs can be expressed within an intuitionistic and predicative foundation, like constructive type theory
In a recent article Facchini and Finocchiaro considered a natural pretorsion theory in the category ...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...
By introducing lattice-valued covers of a set, we present a general framework for uniform structures...
We introduce the notion of infinitary preorder and use it to obtain a predicative presentation of su...
AbstractWe introduce the notion of infinitary preorder and use it to obtain a predicative presentati...
Consiglio Nazionale delle Ricerche (CNR). Biblioteca Centrale / CNR - Consiglio Nazionale delle Rich...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
A sup-lattice is a complete lattice, a morphism of sup-lattices is a mapping preserving arbitrary su...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
AbstractLet κQnt be the category of κ-quantales, quantales closed under κ-joins in which the monoid ...
AbstractQuantaloids are categories enriched in the symmetric, monoidal closed category of sup-lattic...
We show that (Pretop(X), <=), the lattice of pretopologies on an arbitrary set X, always has a frame...
While the study of quantale-like structures goes back up to the 1930’s (not-withstanding that the te...
In a recent article Facchini and Finocchiaro considered a natural pretorsion theory in the category ...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...
By introducing lattice-valued covers of a set, we present a general framework for uniform structures...
We introduce the notion of infinitary preorder and use it to obtain a predicative presentation of su...
AbstractWe introduce the notion of infinitary preorder and use it to obtain a predicative presentati...
Consiglio Nazionale delle Ricerche (CNR). Biblioteca Centrale / CNR - Consiglio Nazionale delle Rich...
Abstract. Quantales can be viewed as a framework for a non—commutative topology. Basic properties of...
A sup-lattice is a complete lattice, a morphism of sup-lattices is a mapping preserving arbitrary su...
While the study of quantale-like structures goes back up to the 1930’s (notwithstanding that the ter...
AbstractA quantale is a complete lattice provided with a (generally non commutative) binary multipli...
summary:The paper considers a fuzzification of the notion of quantaloid of K. I. Rosenthal, which re...
AbstractLet κQnt be the category of κ-quantales, quantales closed under κ-joins in which the monoid ...
AbstractQuantaloids are categories enriched in the symmetric, monoidal closed category of sup-lattic...
We show that (Pretop(X), <=), the lattice of pretopologies on an arbitrary set X, always has a frame...
While the study of quantale-like structures goes back up to the 1930’s (not-withstanding that the te...
In a recent article Facchini and Finocchiaro considered a natural pretorsion theory in the category ...
AbstractRegular projective quantales are characterized as the weakly ∗-stable completely distributiv...
By introducing lattice-valued covers of a set, we present a general framework for uniform structures...