AbstractIn this paper, we prove that there exists a perfect GO-space which cannot densely embed in any perfect orderable space. This result answers an open question: “Does every perfect GO-space have an orderable perfect space in which it densely embeds?
In this paper, first we shall make a survey of metrizability theorems by means of spaces with certai...
AbstractLet X be a nonarchimedean space and C be the union of all compact open subsets of X. The fol...
Conditions which force the metrizability of GO-spaces are well known (see [Fa]). Since GO-spaces are...
AbstractIn this paper, we prove that there exists a perfect GO-space which cannot densely embed in a...
A linearly orderd topological space (addreviated LOSTS) is a triple , where is a linealy ordered se...
AbstractIt is an old problem posed by Bennett and Lutzer whether every perfect GO-space has a perfec...
AbstractIt is an old problem posed by Bennett and Lutzer whether every perfect GO-space has a perfec...
AbstractWe prove a main theorem: Theorem. There always exists a minimal linearly ordered d-extension...
AbstractIn this paper we study four properties related to the existence of a dense metrizable subspa...
By a linearly ordered topological space CLOTS) we mean a linearly ordered set equipped with the usua...
AbstractWe obtain sufficient conditions for a linearly ordered topological space (LOTS) to be densel...
AbstractIn this note we give ZFC results that reduce the question of Maarten Maurice about the exist...
AbstractIn this paper we characterize generalized ordered spaces that are metrizably fibered in term...
AbstractA space equipped with a (total) order is a GO space if it is embeddable by an order preservi...
AbstractIn this paper we study four properties related to the existence of a dense metrizable subspa...
In this paper, first we shall make a survey of metrizability theorems by means of spaces with certai...
AbstractLet X be a nonarchimedean space and C be the union of all compact open subsets of X. The fol...
Conditions which force the metrizability of GO-spaces are well known (see [Fa]). Since GO-spaces are...
AbstractIn this paper, we prove that there exists a perfect GO-space which cannot densely embed in a...
A linearly orderd topological space (addreviated LOSTS) is a triple , where is a linealy ordered se...
AbstractIt is an old problem posed by Bennett and Lutzer whether every perfect GO-space has a perfec...
AbstractIt is an old problem posed by Bennett and Lutzer whether every perfect GO-space has a perfec...
AbstractWe prove a main theorem: Theorem. There always exists a minimal linearly ordered d-extension...
AbstractIn this paper we study four properties related to the existence of a dense metrizable subspa...
By a linearly ordered topological space CLOTS) we mean a linearly ordered set equipped with the usua...
AbstractWe obtain sufficient conditions for a linearly ordered topological space (LOTS) to be densel...
AbstractIn this note we give ZFC results that reduce the question of Maarten Maurice about the exist...
AbstractIn this paper we characterize generalized ordered spaces that are metrizably fibered in term...
AbstractA space equipped with a (total) order is a GO space if it is embeddable by an order preservi...
AbstractIn this paper we study four properties related to the existence of a dense metrizable subspa...
In this paper, first we shall make a survey of metrizability theorems by means of spaces with certai...
AbstractLet X be a nonarchimedean space and C be the union of all compact open subsets of X. The fol...
Conditions which force the metrizability of GO-spaces are well known (see [Fa]). Since GO-spaces are...
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