Add to ORKGWe show that any topological pair with normally embedded subspace has the strong shape of a pair, such that the inclusion map of the subspace into the total space is a cofibration. Furthermore we prove that a strong shape morphism of pairs is a strong shape equivalence if and only if it operates as strong shape equivalence of the total spaces and of the subspaces considered seperately
In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to...
Using the intrinsic definition of shape we prove an analogue of well known Borsuk’s theorem for comp...
AbstractThe author and N. Uglešić have recently introduced a new classification of topological space...
Normal embeddings are characterized in terms of an approximate extension property, whence a generali...
AbstractFor every pair (C,K) of groupoid enriched categories, we define two related categories S(C,K...
AbstractThe notion of shape fibration was introduced by Mardešić and Rushing. In this paper we use ‘...
AbstractOrdinary shape equivalences can be defined in full generality, for every pair (C,K) of abstr...
AbstractOrdinary shape equivalences can be defined in full generality, for every pair (C,K) of abstr...
AbstractIt is shown that every compact Hausdorff space admits an embedding in an “improved” topologi...
AbstractIf one replaces continuous mappings by strong shape morphisms with compact support (also cal...
summary:J. Keesling has shown that for connected spaces $X$ the natural inclusion $e:X\rightarrow \b...
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...
AbstractIn this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is...
In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to...
In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to...
Using the intrinsic definition of shape we prove an analogue of well known Borsuk’s theorem for comp...
AbstractThe author and N. Uglešić have recently introduced a new classification of topological space...
Normal embeddings are characterized in terms of an approximate extension property, whence a generali...
AbstractFor every pair (C,K) of groupoid enriched categories, we define two related categories S(C,K...
AbstractThe notion of shape fibration was introduced by Mardešić and Rushing. In this paper we use ‘...
AbstractOrdinary shape equivalences can be defined in full generality, for every pair (C,K) of abstr...
AbstractOrdinary shape equivalences can be defined in full generality, for every pair (C,K) of abstr...
AbstractIt is shown that every compact Hausdorff space admits an embedding in an “improved” topologi...
AbstractIf one replaces continuous mappings by strong shape morphisms with compact support (also cal...
summary:J. Keesling has shown that for connected spaces $X$ the natural inclusion $e:X\rightarrow \b...
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...
AbstractIn this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is...
In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to...
In this note the cotelescope construction of fibrant extension (Cathey, 1979) of compacta is used to...
Using the intrinsic definition of shape we prove an analogue of well known Borsuk’s theorem for comp...
AbstractThe author and N. Uglešić have recently introduced a new classification of topological space...