Roman Pol scite author profile

Two closely connected topics are discussed: countable tightness in the spaces P(S) of regular probability measures with the weak topology and a convex analogue to Lindelof property of the weak topology of the function spaces C(S) defined by H. H. Corson. The main result of this note exhibits a rather wide class of compact spaces stable under standard operations including the operation P(S) 9 such that within this class both of the properties we deal with are dual each other and they behave in a regular way. Some related open problems are stated.1* Introduction* In this note we consider two closely connected topics: countable tightness in the spaces P(S) of regular probability measures on compact spaces endowed with the weak* topology and property (C)-a convex analogue to Lindelof property of the weak topology of function spaces C(S) defined by H. H. Corson [6] (for the terminology and definitions see § §2 and 3).Our results are related to the following two problems: C(S) is equivalent to a property of P(S) which is a convex analogue to countable tightness (see Lemma 3.2). This property is a priori weaker than countable tightness but no example known to us shows that this is realy the case. So, for what compact spaces S countable tightness of P(S) is equivalent to property (C) of C(S), or putting this another way, when property (C) and countable tightness are dual each other'! (B) Does the function space C(S x S) or C(P(S)) have property (C) provided that the space C(S) has this property! Does countable tightness of the space P(S x S) or P(P(S)) follow from countable tightness of the space P(S)?It should be mentioned here that the only examples we know of compact spaces S with countable tightness for which C(S) fails to have property (C) or P(S) fails to have countable tightness, due to Hay don [14] and to van Douwen and Fleissner [7], are constructed under additional set theoretic hypotheses. This yields yet another problem, whether in such examples some extra axioms for set theory are necessary (the results of this note, however, have no connection to this question). 185 ROMAN POLWe shall consider the class of compact spaces S such that each regular measure on S is determined by its values on a countable collection of compact sets (Definition 3.3). Our main result (see Theorem 4.1 and Corollary 4.2) is that this class of spaces is closed under the operation P(S) and some other standard topological operations, and that in the realm of this class the questions stated in (A) and (B) have always a positive answer.In this context the question arises how wide is the class of spaces we deal with and to what extent the countable determinantness of regular measures on S is connected to property (C) of C(S) or to countable tightness of P(S)? The class we consider includes many "classical" compact spaces (cf. Example 3.7). In fact, no example is known to us of a compact space S outside of this class for which C(S) has property (C) or P(S) has countable tightness (but we see also no reason why such spaces should not exis...

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On metric spaces with the Haver property which are Menger spaces

Pol

2010

Topology and its Applications

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A metric space (X, d) has the Haver property if for each sequence 1 , 2 , . . . of positive numbers there exist disjoint open collections V 1 , V 2 , . . . of open subsets of X, with diameters of members of V i less than i and ∞ i=1 V i covering X, and the Menger property is a classical covering counterpart to σ -compactness. We show that, under Martin's Axiom MA, the metric square (X, d) × (X, d) of a separable metric space with the Haver property can fail this property, even if X 2 is a Menger space, and that there is a separable normed linear Menger space M such that (M, d) has the Haver property for every translation invariant metric d generating the topology of M, but not for every metric generating the topology. These results answer some questions by L. Babinkostova [L. Babinkostova, When does the Haver property imply selective screenability? Topology Appl. 154 (2007) 1971-1979; L. Babinkostova, Selective screenability in topological groups, Topology Appl. 156 (1) (2008) 2-9].

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On a question of H.H. Corson and some related problems

Pol¹

1980

Fund. Math.

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A metric space with the Haver property whose square fails this property

Pol

2008

Proc. Amer. Math. Soc.

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Roman Pol

Mappings of Baire spaces into function spaces and Kadeč renorming

Note on the spacesP(S) of regular probability measures whose topology is determined by countable subsets

On metric spaces with the Haver property which are Menger spaces

On a question of H.H. Corson and some related problems

A metric space with the Haver property whose square fails this property

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