Add to ORKGsummary:The notion of locally $r$-incomparable families of compacta was introduced by K. Borsuk [KB]. In this paper we shall construct uncountable locally $r$-incomparable families of different types of finite-dimensional Cantor manifolds
An infinite-dimensional manifold is a topological manifold modeled on some infinite-dimensional homo...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...
summary:The notion of locally $r$-incomparable families of compacta was introduced by K. Borsuk [KB]...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
Abstract. In this note we construct a family of continuum many hereditarily strongly innite-dimensio...
AbstractWe construct a family {Ys:s∈S} of cardinality 2ℵ0 of hereditarily indecomposable continua wh...
Among other results we prove: (1) If f:X→Y is a closed surjection between normal countably compact s...
Among other results we prove: (1) If f:X→Y is a closed surjection between normal countably compact s...
AbstractWe construct a family {Ys:s∈S} of cardinality 2ℵ0 of hereditarily indecomposable continua wh...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
AbstractDimension theory for separable metric spaces is approached using the concept of essential fa...
AbstractWe show that there exist rigid hereditarily indecomposable continua which are: (a)n-dimensio...
An infinite-dimensional manifold is a topological manifold modeled on some infinite-dimensional homo...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...
summary:The notion of locally $r$-incomparable families of compacta was introduced by K. Borsuk [KB]...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
Abstract. In this note we construct a family of continuum many hereditarily strongly innite-dimensio...
AbstractWe construct a family {Ys:s∈S} of cardinality 2ℵ0 of hereditarily indecomposable continua wh...
Among other results we prove: (1) If f:X→Y is a closed surjection between normal countably compact s...
Among other results we prove: (1) If f:X→Y is a closed surjection between normal countably compact s...
AbstractWe construct a family {Ys:s∈S} of cardinality 2ℵ0 of hereditarily indecomposable continua wh...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
AbstractDimension theory for separable metric spaces is approached using the concept of essential fa...
AbstractWe show that there exist rigid hereditarily indecomposable continua which are: (a)n-dimensio...
An infinite-dimensional manifold is a topological manifold modeled on some infinite-dimensional homo...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
AbstractThe Menger Property is a classical covering counterpart to σ-compactness. Assuming the Conti...