AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X in a compactification αX. We then see that (for these X) the smallest compactification to which a function fϵC∗(X) extends has a closed, bounded interval for a remainder
fications and semi-normal spaces1 introduced the notion of a normal base Z to construct Hausdorff co...
AbstractIt is well known that every compactification of a completely regular space X can be generate...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
The thesis is divided into two distinct parts. In the first part we raise some questions about pseud...
AbstractWe give new sufficient conditions for a continuum to be a remainder of H . We also show that...
AbstractThis paper gives conditions under which the remainder of Stone-Čech compactification satisfi...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
Abstract. We investigate Kelley continua that arise as the remainder of Kelley compactifications of ...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
We present a constructive proof of the fact, that for any subset ⊆ ℝm and a countable family ℱ of b...
Abstract. A. Lelek asked which continua are remainders of locally connected compactifications of the...
AbstractWe give new sufficient conditions for a continuum to be a remainder of H . We also show that...
We present a constructive proof of the fact, that for any subset ⊆ ℝm and a countable family ℱ of b...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
fications and semi-normal spaces1 introduced the notion of a normal base Z to construct Hausdorff co...
AbstractIt is well known that every compactification of a completely regular space X can be generate...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
The thesis is divided into two distinct parts. In the first part we raise some questions about pseud...
AbstractWe give new sufficient conditions for a continuum to be a remainder of H . We also show that...
AbstractThis paper gives conditions under which the remainder of Stone-Čech compactification satisfi...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
Abstract. We investigate Kelley continua that arise as the remainder of Kelley compactifications of ...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
We present a constructive proof of the fact, that for any subset ⊆ ℝm and a countable family ℱ of b...
Abstract. A. Lelek asked which continua are remainders of locally connected compactifications of the...
AbstractWe give new sufficient conditions for a continuum to be a remainder of H . We also show that...
We present a constructive proof of the fact, that for any subset ⊆ ℝm and a countable family ℱ of b...
AbstractWe look for internal necessary and sufficient conditions for a subset F of the algebra of al...
fications and semi-normal spaces1 introduced the notion of a normal base Z to construct Hausdorff co...
AbstractIt is well known that every compactification of a completely regular space X can be generate...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
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