Add to ORKGtextabstractGeneralized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawvere 1973). Combining Lawvere's (1973) enriched-categorical and Smyth' (1988, 1991) topological view on generalized metric spaces, it is shown how to construct 1. completion, 2. topology, and 3. powerdomains for generalized metric spaces. Restricted to the special cases of preorders and ordinary metric spaces, these constructions yield, respectively: 1. chain completion and Cauchy completion; 2. the Alexandroff and the Scott topology, and the epsilon-ball topology; 3. lower, upper, and convex powerdomains, and the hyperspace of compact subsets. All constructions are formulated in terms of (a metric version of) the Yoneda (1954) embe...
AbstractWe study the heredity of the classes of generalized metric spaces to the hyperspaces of non-...
Abstract. It is known from [13] that nonsymmetric metric spaces corre-spond to enrichments over the ...
Several theories aimed at reconciling the partial order and the metric space approaches to Domain T...
AbstractGeneralized metric spaces are a common generalization of preorders and ordinary metric space...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
textabstractGeneralized ultrametric spaces are a common generalization of preorders and ordinary ult...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
Following Lawvere, a generalized metric space (gms) is a set X equipped with a metric map from X2 to...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
Abstract1.(a) Limits of Cauchy sequences in a (possibly nonsymmetric) metric space are shown to be w...
AbstractSeveral theories aimed at reconciling the partial order and the metric space approaches to D...
textabstract(a) Limits of Cauchy sequences in a (possibly non-symmetric) metric space are shown to ...
In this note, we give an example to answer affirmatively Ge-Lin's question on the completion of part...
summary:An existing description of the cartesian closed topological hull of $p\text{\bf MET}^\infty$...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
AbstractWe study the heredity of the classes of generalized metric spaces to the hyperspaces of non-...
Abstract. It is known from [13] that nonsymmetric metric spaces corre-spond to enrichments over the ...
Several theories aimed at reconciling the partial order and the metric space approaches to Domain T...
AbstractGeneralized metric spaces are a common generalization of preorders and ordinary metric space...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
textabstractGeneralized ultrametric spaces are a common generalization of preorders and ordinary ult...
Generalized metric spaces are a common generalization of preorders and ordinary metric spaces (Lawve...
Following Lawvere, a generalized metric space (gms) is a set X equipped with a metric map from X2 to...
The primary objective of this paper is to consider a metric space (X,d) that is not complete and ana...
Abstract1.(a) Limits of Cauchy sequences in a (possibly nonsymmetric) metric space are shown to be w...
AbstractSeveral theories aimed at reconciling the partial order and the metric space approaches to D...
textabstract(a) Limits of Cauchy sequences in a (possibly non-symmetric) metric space are shown to ...
In this note, we give an example to answer affirmatively Ge-Lin's question on the completion of part...
summary:An existing description of the cartesian closed topological hull of $p\text{\bf MET}^\infty$...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
AbstractWe study the heredity of the classes of generalized metric spaces to the hyperspaces of non-...
Abstract. It is known from [13] that nonsymmetric metric spaces corre-spond to enrichments over the ...
Several theories aimed at reconciling the partial order and the metric space approaches to Domain T...