Categorically closed topological groups
Abstract
Let C be a subcategory of the category of topologized semigroups and their partial continuous homomorphisms. An object X of the category C is called C-closed if for each morphism f:X Y of the category C the image f(X) is closed in Y. In the paper we detect topological groups which are C-closed for the categories C whose objects are Hausdorff topological (semi)groups and whose morphisms are isomorphic topological embeddings, injective continuous homomorphisms, continuous homomorphisms, or partial continuous homomorphisms with closed domain.
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