AbstractThe category of finitely-generated spaces is shown to be the largest hereditary cartesian closed coreflective subcategory of the category Top of topological spaces. Consequently, any coreflective subcategory of Top which is contained in a cartesian closed coreflective subcategory and contains a space which is not finitely-generated fails to be hereditary
AbstractThe paper begins with a general construction of a coreflective subcategory of an epireflecti...
It is well known that, although the category of topological spaces is not Cartesian closed, it posse...
AbstractIn this paper the lattice of all epireflective subcategories of a topological category is st...
AbstractThe category of finitely-generated spaces is shown to be the largest hereditary cartesian cl...
AbstractThe category of finitely-generated spaces is shown to be the largest finitely productive car...
AbstractAnswering the first part of Problem 7 in [10] we prove that there is no largest cartesian cl...
AbstractThe paper begins with a general construction of a coreflective subcategory of an epireflecti...
AbstractThere are two main approaches to obtaining “topological” cartesian-closed categories. Under ...
Abstract. The aim of this paper is to investigate closed hereditary additive and divisible (AD) subc...
In this paper, we find the coreflective hull of the category of indiscrete [0; 1]-topological spaces...
The category TOP of topological spaces is not cartesian closed, but can be embedded into the cartes...
AbstractWe present characterizations of subcategories inducing weakly hereditary regular closure ope...
AbstractA concrete category K is a CCT (cartesian closed topological) extension of the category Unif...
AbstractWe introduce the new topology on a topological space generated by the -sets. For an extensiv...
AbstractThis paper studies cartesian closed topological categories inside the category of uniform li...
AbstractThe paper begins with a general construction of a coreflective subcategory of an epireflecti...
It is well known that, although the category of topological spaces is not Cartesian closed, it posse...
AbstractIn this paper the lattice of all epireflective subcategories of a topological category is st...
AbstractThe category of finitely-generated spaces is shown to be the largest hereditary cartesian cl...
AbstractThe category of finitely-generated spaces is shown to be the largest finitely productive car...
AbstractAnswering the first part of Problem 7 in [10] we prove that there is no largest cartesian cl...
AbstractThe paper begins with a general construction of a coreflective subcategory of an epireflecti...
AbstractThere are two main approaches to obtaining “topological” cartesian-closed categories. Under ...
Abstract. The aim of this paper is to investigate closed hereditary additive and divisible (AD) subc...
In this paper, we find the coreflective hull of the category of indiscrete [0; 1]-topological spaces...
The category TOP of topological spaces is not cartesian closed, but can be embedded into the cartes...
AbstractWe present characterizations of subcategories inducing weakly hereditary regular closure ope...
AbstractA concrete category K is a CCT (cartesian closed topological) extension of the category Unif...
AbstractWe introduce the new topology on a topological space generated by the -sets. For an extensiv...
AbstractThis paper studies cartesian closed topological categories inside the category of uniform li...
AbstractThe paper begins with a general construction of a coreflective subcategory of an epireflecti...
It is well known that, although the category of topological spaces is not Cartesian closed, it posse...
AbstractIn this paper the lattice of all epireflective subcategories of a topological category is st...
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