AbstractThe purpose of this paper is to give a condition under which the union of two C-embedded subsets of a space X is C-embedded in X, and apply it to obtain a homotopy extension theorem stating that a pair (X, A) of spaces has the homotopy extension property with respect to a separable Čech complete ANR for metric spaces iff A is C-embedded in X
AbstractWe consider the question: when is a dense subset of a space X C-embedded in X? We introduce ...
AbstractIt is proved that a FH(FRT2) space X is z-embedded in every FH(FRT1) space that X is embedde...
AbstractWe present some generalizations and improvements of results due to I. Aharoni and P. Assouad...
AbstractWe say that a subset S of a topological space X is M-embedded (MN0-embedded) in X if every m...
[EN] The first part of the paper is a brief survey on recent topics concerning the relationship betw...
There are four main results in this paper: (1) a necessary condition for the product of a space with...
AbstractA subset S of a metric space X is U-embedded in X if every uniformly continuous real-valued ...
AbstractLet X be a topological space and A its subspace. The following problem posed by Przymusiński...
AbstractArhangel'skiı̆ defines in [Topology Appl. 70 (1996) 87–99] a subspace Y of a topologi...
AbstractIn this paper we will give an internal characterization of topological c-embedded spaces
AbstractThe proof of Štan'ko's embedding approximation theorem is simplified and extended to a relat...
Abstract Arhangel'skiȋ defines in [Topology Appl. 70 (1996) [Topology Appl. 93 (1999) 121-1...
AbstractAn open subset W of Sn, n ⩾ 6 or n = 4, and a homotopy equivalence ƒ: S2 × Sn − 4 → W are co...
AbstractExtension Theory can be defined as studying extensions of maps from topological spaces to me...
AbstractSeveral theorems are presented on the relation υ(X × Y) = υX × υ Y; the proofs use the idea ...
AbstractWe consider the question: when is a dense subset of a space X C-embedded in X? We introduce ...
AbstractIt is proved that a FH(FRT2) space X is z-embedded in every FH(FRT1) space that X is embedde...
AbstractWe present some generalizations and improvements of results due to I. Aharoni and P. Assouad...
AbstractWe say that a subset S of a topological space X is M-embedded (MN0-embedded) in X if every m...
[EN] The first part of the paper is a brief survey on recent topics concerning the relationship betw...
There are four main results in this paper: (1) a necessary condition for the product of a space with...
AbstractA subset S of a metric space X is U-embedded in X if every uniformly continuous real-valued ...
AbstractLet X be a topological space and A its subspace. The following problem posed by Przymusiński...
AbstractArhangel'skiı̆ defines in [Topology Appl. 70 (1996) 87–99] a subspace Y of a topologi...
AbstractIn this paper we will give an internal characterization of topological c-embedded spaces
AbstractThe proof of Štan'ko's embedding approximation theorem is simplified and extended to a relat...
Abstract Arhangel'skiȋ defines in [Topology Appl. 70 (1996) [Topology Appl. 93 (1999) 121-1...
AbstractAn open subset W of Sn, n ⩾ 6 or n = 4, and a homotopy equivalence ƒ: S2 × Sn − 4 → W are co...
AbstractExtension Theory can be defined as studying extensions of maps from topological spaces to me...
AbstractSeveral theorems are presented on the relation υ(X × Y) = υX × υ Y; the proofs use the idea ...
AbstractWe consider the question: when is a dense subset of a space X C-embedded in X? We introduce ...
AbstractIt is proved that a FH(FRT2) space X is z-embedded in every FH(FRT1) space that X is embedde...
AbstractWe present some generalizations and improvements of results due to I. Aharoni and P. Assouad...
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