Add to ORKGIn [1] a product operation of compactifications is defined. In this paper, we investigate the relations among products of some compactifications of X, compactifications generated by some subsets of C*(X) and some remainders of X
summary:We prove a Dichotomy Theorem: for each Hausdorff compactification $bG$ of an arbitrary topol...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
Throughout this paper all spaces are assumed to be completely regular and T1. A compactification αX ...
WOS: 000175849100011A product operation of compactifications is defined and its different properties...
AbstractThis paper gives conditions under which the remainder of Stone-Čech compactification satisfi...
AbstractCompactifications preserving the dimension of a normal space are described in the partially ...
AbstractThe present paper is a continuation of three papers written by B.J. Ball and Shoji Yokura wh...
WOS: 000176411500005Compactifications preserving the dimension of a normal space are described in th...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
AbstractIt is well known that every compactification of a completely regular space X can be generate...
(Communicated by Fariborz Azarpanah) Abstract. In this paper, we prove a dichotomy theorem for re-ma...
In the set of compactifications of X we consider the partial pre-order defined by (W, h) ≤X (Z, g) i...
AbstractThe approach to the problem of the distribution of the functors of the Stone–Čech compactifi...
AbstractThis paper is concerned with compactness and compactifications in the epireflective hull of ...
summary:We prove a Dichotomy Theorem: for each Hausdorff compactification $bG$ of an arbitrary topol...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
Throughout this paper all spaces are assumed to be completely regular and T1. A compactification αX ...
WOS: 000175849100011A product operation of compactifications is defined and its different properties...
AbstractThis paper gives conditions under which the remainder of Stone-Čech compactification satisfi...
AbstractCompactifications preserving the dimension of a normal space are described in the partially ...
AbstractThe present paper is a continuation of three papers written by B.J. Ball and Shoji Yokura wh...
WOS: 000176411500005Compactifications preserving the dimension of a normal space are described in th...
AbstractWhen does a Tychonoff space X have a Hausdorff compactification with the remainder belonging...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
AbstractIt is well known that every compactification of a completely regular space X can be generate...
(Communicated by Fariborz Azarpanah) Abstract. In this paper, we prove a dichotomy theorem for re-ma...
In the set of compactifications of X we consider the partial pre-order defined by (W, h) ≤X (Z, g) i...
AbstractThe approach to the problem of the distribution of the functors of the Stone–Čech compactifi...
AbstractThis paper is concerned with compactness and compactifications in the epireflective hull of ...
summary:We prove a Dichotomy Theorem: for each Hausdorff compactification $bG$ of an arbitrary topol...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
Throughout this paper all spaces are assumed to be completely regular and T1. A compactification αX ...