AbstractFor every zero-dimensional space E of non-measurable cardinality we construct a zero-dimensional, hereditarily realcompact, locally compact and locally countable space which cannot be embedded as a closed subspace into any topological power of the space E. Under the assumption that all cardinals are non-measurable it gives the result stated in the title.This is an answer for a question raised by H. Herrlic
This chapter discusses what completely regular space (X) can be characterized by the fact that some,...
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
AbstractP. Roy introduced the space Δ as an example of a metric space satisfying ind X−0, dim X >. I...
AbstractDenote βX − X by X∗. Define properties P0 and P1 of a space X by Pi (i<2): if D ⊆ X∗ is coun...
For a topological space <X,] ) and an infini te cardinal K, we denote by](K) the G-modification o...
For a topological space <X,] ) and an infini te cardinal K, we denote by](K) the G-modification o...
AbstractDenote βX − X by X∗. Define properties P0 and P1 of a space X by Pi (i<2): if D ⊆ X∗ is coun...
AbstractWe show that every uncountable compact space has a realcompact subspace of size ω1, that if ...
V. S. Varadarajan proved in [7] that any classical observable on the real line is a measurable mappi...
AbstractPF-compact spaces are defined. Every almost realcompact space is PF-compact and every separa...
AbstractComfort and Hager investigate the notion of a maximal realcompact space and ask about the re...
AbstractWe show that every compact space of large enough size has a realcompact subspace of size κ, ...
Abstract. In this note I will present a proof that, assuming PFA, if R is a measure algebra then aft...
AbstractWe use the space (ω1,τ(C→)) associated with a guessing sequence C→ on ω1 to show that it is ...
AbstractWe study realcompactness in the classes of submaximal and maximal spaces. It is shown that a...
This chapter discusses what completely regular space (X) can be characterized by the fact that some,...
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
AbstractP. Roy introduced the space Δ as an example of a metric space satisfying ind X−0, dim X >. I...
AbstractDenote βX − X by X∗. Define properties P0 and P1 of a space X by Pi (i<2): if D ⊆ X∗ is coun...
For a topological space <X,] ) and an infini te cardinal K, we denote by](K) the G-modification o...
For a topological space <X,] ) and an infini te cardinal K, we denote by](K) the G-modification o...
AbstractDenote βX − X by X∗. Define properties P0 and P1 of a space X by Pi (i<2): if D ⊆ X∗ is coun...
AbstractWe show that every uncountable compact space has a realcompact subspace of size ω1, that if ...
V. S. Varadarajan proved in [7] that any classical observable on the real line is a measurable mappi...
AbstractPF-compact spaces are defined. Every almost realcompact space is PF-compact and every separa...
AbstractComfort and Hager investigate the notion of a maximal realcompact space and ask about the re...
AbstractWe show that every compact space of large enough size has a realcompact subspace of size κ, ...
Abstract. In this note I will present a proof that, assuming PFA, if R is a measure algebra then aft...
AbstractWe use the space (ω1,τ(C→)) associated with a guessing sequence C→ on ω1 to show that it is ...
AbstractWe study realcompactness in the classes of submaximal and maximal spaces. It is shown that a...
This chapter discusses what completely regular space (X) can be characterized by the fact that some,...
Abstract. A space X is truly weakly pseudocompact if X is either weakly pseu-docompact or Lindelöf ...
AbstractP. Roy introduced the space Δ as an example of a metric space satisfying ind X−0, dim X >. I...
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