AbstractIf one replaces continuous mappings by strong shape morphisms with compact support (also called compact-open strong shape mappings) (Definition 2.1) and compact polyhedra by arbitrary subspaces of some Sn, then every object X in the corresponding S-category B has an S-dual DX extending classical S-duality to arbitrary separable metrizable, finite-dimensional spaces
We show that any topological pair with normally embedded subspace has the strong shape of a pair, su...
AbstractIt is shown that the strong shape theory of compact metrizable spaces extends to a theory fo...
Direct products are defined in arbitrary categories and are unique, whenever they exist. In the cate...
AbstractIf one replaces continuous mappings by strong shape morphisms with compact support (also cal...
AbstractIt is shown that the strong shape theory of compact metrizable spaces extends to a theory fo...
AbstractIt is shown that every compact Hausdorff space admits an embedding in an “improved” topologi...
AbstractWe use an Artin-Mazur type strong shape functor to prove that the strong category of compact...
of compact metric spaces in the pseudo-interior of the Hilbert cube Q and fundamental sequences. Thi...
AbstractThe notion of strong expansion of a space is introduced and studied. It is shown that one ca...
AbstractThe notion of shape fibration was introduced by Mardešić and Rushing. In this paper we use ‘...
AbstractIn this paper we propose a construction of the equivariant strong shape for compact metrizab...
The main goal of the project is to lay foundations and develop the intrinsic definition of shape. Th...
AbstractWe use an Artin-Mazur type strong shape functor to prove that the strong category of compact...
AbstractA strong shape category for finitistic uniform spaces is constructed and it is shown, that c...
AbstractFor every pair (C,K) of groupoid enriched categories, we define two related categories S(C,K...
We show that any topological pair with normally embedded subspace has the strong shape of a pair, su...
AbstractIt is shown that the strong shape theory of compact metrizable spaces extends to a theory fo...
Direct products are defined in arbitrary categories and are unique, whenever they exist. In the cate...
AbstractIf one replaces continuous mappings by strong shape morphisms with compact support (also cal...
AbstractIt is shown that the strong shape theory of compact metrizable spaces extends to a theory fo...
AbstractIt is shown that every compact Hausdorff space admits an embedding in an “improved” topologi...
AbstractWe use an Artin-Mazur type strong shape functor to prove that the strong category of compact...
of compact metric spaces in the pseudo-interior of the Hilbert cube Q and fundamental sequences. Thi...
AbstractThe notion of strong expansion of a space is introduced and studied. It is shown that one ca...
AbstractThe notion of shape fibration was introduced by Mardešić and Rushing. In this paper we use ‘...
AbstractIn this paper we propose a construction of the equivariant strong shape for compact metrizab...
The main goal of the project is to lay foundations and develop the intrinsic definition of shape. Th...
AbstractWe use an Artin-Mazur type strong shape functor to prove that the strong category of compact...
AbstractA strong shape category for finitistic uniform spaces is constructed and it is shown, that c...
AbstractFor every pair (C,K) of groupoid enriched categories, we define two related categories S(C,K...
We show that any topological pair with normally embedded subspace has the strong shape of a pair, su...
AbstractIt is shown that the strong shape theory of compact metrizable spaces extends to a theory fo...
Direct products are defined in arbitrary categories and are unique, whenever they exist. In the cate...
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