AbstractThis paper gives conditions under which the remainder of Stone-Čech compactification satisfies given dimensional properties. The theorems on existence of residual sets in spaces of mappings are applied to constructing a sufficient number of compactifications with remainders of given dimension
AbstractThe remainders of compactifications of Tychonoff spaces have been studied extensively during...
Two types of seemingly unrelated extension problems are discussed in this book. Their common focus i...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
WOS: 000176411500005Compactifications preserving the dimension of a normal space are described in th...
fications and semi-normal spaces1 introduced the notion of a normal base Z to construct Hausdorff co...
AbstractCompactifications preserving the dimension of a normal space are described in the partially ...
AbstractIf X is locally compact, then X is the Stone-Čech remainder of a normal space. A partial con...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
Every space is assumed to be separable and metric. A space is called (strongly) countably dimensiona...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
summary:We prove that every compact space $X$ is a Čech-Stone compactification of a normal subspace ...
In [1] a product operation of compactifications is defined. In this paper, we investigate the relati...
AbstractThis article is a natural continuation of [A.V. Arhangel'skii, Remainders in compactificatio...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
The thesis is divided into two distinct parts. In the first part we raise some questions about pseud...
AbstractThe remainders of compactifications of Tychonoff spaces have been studied extensively during...
Two types of seemingly unrelated extension problems are discussed in this book. Their common focus i...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
WOS: 000176411500005Compactifications preserving the dimension of a normal space are described in th...
fications and semi-normal spaces1 introduced the notion of a normal base Z to construct Hausdorff co...
AbstractCompactifications preserving the dimension of a normal space are described in the partially ...
AbstractIf X is locally compact, then X is the Stone-Čech remainder of a normal space. A partial con...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
Every space is assumed to be separable and metric. A space is called (strongly) countably dimensiona...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
summary:We prove that every compact space $X$ is a Čech-Stone compactification of a normal subspace ...
In [1] a product operation of compactifications is defined. In this paper, we investigate the relati...
AbstractThis article is a natural continuation of [A.V. Arhangel'skii, Remainders in compactificatio...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
The thesis is divided into two distinct parts. In the first part we raise some questions about pseud...
AbstractThe remainders of compactifications of Tychonoff spaces have been studied extensively during...
Two types of seemingly unrelated extension problems are discussed in this book. Their common focus i...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
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