Using Escard\uf3\u2019s characterization of injectivity via Kock\u2013Z\uf6berleinmonads, we introduce suitable monads in comma categories of topological spaces that yield characterizations of fibrewiseinjectivity in topological T0-spaces, with respect to the class of embeddings, and of dense, of flat and of completely flat embeddings. Characterizations, in the category of topological spaces, of injective maps with respect to the same classes of embeddings follow easily from the results obtained for T0-spaces. Moreover, it is shown that, together with the corresponding embeddings, injective continuous maps form a weak factorization system in the category of topological (T0-)spaces and continuous maps
AbstractWe investigate injectivity in a comma-category C/B using the notion of the “object of sectio...
We investigate injective objects with respect to the class of embeddings in the categories Top/B (...
Injectivity in a comma-category C/B is investigated using the notion of the \u201cobject of sectio...
Using Escard\uf3\u2019s characterization of injectivity via Kock\u2013Z\uf6berleinmonads, we introdu...
Fibrewise notions of continuous lattice, continuous Scott domain, and stably compact space were intr...
This paper studies injectivity for continuous maps between T0-spaces. The new characterizations obta...
This paper studies injectivity for continuous maps between T0-spaces. The new characterizations obta...
AbstractMany categories of semantic domains can be considered from an order-theoretic point of view ...
AbstractWe investigate injective objects with respect to the class of embeddings in the categories T...
In the category Top_0 of T_0-spaces and continuous maps, embeddings are just those morphisms with re...
We investigate injective objects with respect to the class of embeddings in the categories Top/B (To...
Notions and techniques of enriched category theory can be used to study topological structures, lik...
AbstractWe give a characterization of injective (with respect to the class of embeddings) topologica...
We give a characterization of injective (with respect to the class of embeddings) topological fibre ...
AbstractThe work of the present author and his coauthors over the past years gives evidence that it ...
AbstractWe investigate injectivity in a comma-category C/B using the notion of the “object of sectio...
We investigate injective objects with respect to the class of embeddings in the categories Top/B (...
Injectivity in a comma-category C/B is investigated using the notion of the \u201cobject of sectio...
Using Escard\uf3\u2019s characterization of injectivity via Kock\u2013Z\uf6berleinmonads, we introdu...
Fibrewise notions of continuous lattice, continuous Scott domain, and stably compact space were intr...
This paper studies injectivity for continuous maps between T0-spaces. The new characterizations obta...
This paper studies injectivity for continuous maps between T0-spaces. The new characterizations obta...
AbstractMany categories of semantic domains can be considered from an order-theoretic point of view ...
AbstractWe investigate injective objects with respect to the class of embeddings in the categories T...
In the category Top_0 of T_0-spaces and continuous maps, embeddings are just those morphisms with re...
We investigate injective objects with respect to the class of embeddings in the categories Top/B (To...
Notions and techniques of enriched category theory can be used to study topological structures, lik...
AbstractWe give a characterization of injective (with respect to the class of embeddings) topologica...
We give a characterization of injective (with respect to the class of embeddings) topological fibre ...
AbstractThe work of the present author and his coauthors over the past years gives evidence that it ...
AbstractWe investigate injectivity in a comma-category C/B using the notion of the “object of sectio...
We investigate injective objects with respect to the class of embeddings in the categories Top/B (...
Injectivity in a comma-category C/B is investigated using the notion of the \u201cobject of sectio...