Add to ORKGWe prove a number of results involving categories enriched over \textsc{CMet}, the category of complete metric spaces with possibly infinite distances. The category \textsc{CPMet} of intrinsic complete metric spaces is locally $\aleph_1$-presentable, closed monoidal, and comonadic over \textsc{CMet}. We also prove that the category \textsc{CCMet} of convex complete metric spaces is not closed monoidal and characterize the isometry-$\aleph_0$-generated objects in \textsc{CMet}, \textsc{CPMet} and \textsc{CCMet}, answering questions by Di Liberti and Rosick\'{y}. Other results include the automatic completeness of a colimit of bi-Lipschitz morphisms of complete metric spaces and a characterization of those pairs (metric space, unital $C^*$-al...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
AbstractFor a Heyting algebra V which, as a category, is monoidal closed, we obtain characterization...
We prove that the category of models of any relational Horn theory satisfying a mild syntactic condi...
Abstract. It is known from [13] that nonsymmetric metric spaces corre-spond to enrichments over the ...
For a commutative quantale $\mathcal{V}$, the category $\mathcal{V}-cat$ canbe perceived as a catego...
We introduce here an intrinsic (quasi-) metric on each positively ordered monoid (P.O.M.), which is ...
For a Heyting algebra V which, as a category, is monoidal closed, we obtain characterizations of exp...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
summary:An existing description of the cartesian closed topological hull of $p\text{\bf MET}^\infty$...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
International audienceWe introduce here an intrinsic (quasi-) metric on each positively ordered mono...
In this thesis we present an overview of some important known facts related to topology, geometry a...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
AbstractFor a Heyting algebra V which, as a category, is monoidal closed, we obtain characterization...
We prove that the category of models of any relational Horn theory satisfying a mild syntactic condi...
Abstract. It is known from [13] that nonsymmetric metric spaces corre-spond to enrichments over the ...
For a commutative quantale $\mathcal{V}$, the category $\mathcal{V}-cat$ canbe perceived as a catego...
We introduce here an intrinsic (quasi-) metric on each positively ordered monoid (P.O.M.), which is ...
For a Heyting algebra V which, as a category, is monoidal closed, we obtain characterizations of exp...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
It is well-known that a metric space $(X, d)$ is complete iff the set $X$ is closed in every metric ...
summary:An existing description of the cartesian closed topological hull of $p\text{\bf MET}^\infty$...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
International audienceWe introduce here an intrinsic (quasi-) metric on each positively ordered mono...
In this thesis we present an overview of some important known facts related to topology, geometry a...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
summary:A criterion for the existence of an initial completion of a concrete category $\bold K$ univ...
AbstractFor a Heyting algebra V which, as a category, is monoidal closed, we obtain characterization...
We prove that the category of models of any relational Horn theory satisfying a mild syntactic condi...