Domination by second countable spaces and Lindelöf Σ-property

Cascales, B.; Orihuela, J.; Tkachuk, Vladimir V.

doi:10.1016/j.topol.2010.10.014

Cited by 29 publications

(66 citation statements)

References 14 publications

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“…The one-point compactification A.Ä/ is an Eberlein compact, then C p .A.Ä// is Lindelöf †. Theorem 2.1 of [5] implies that the function space C p .A.Ä// is a Dieudonné complete and dominated by a second countable space. The hyperspace K.C p .A.Ä/// is also Dieudonné complete (see [16]).…”

Section: For a Given Continuous Mapmentioning

confidence: 97%

“…Suppose that X is strongly dominated by M and take Suppose that K.X / is strongly dominated by the space M . The space X is homeomorphic to the closed subspace F 1 .X/ K.X /, then from 3.3(d) of [5] it follows that X is strongly dominated by the space M . Corollary 2.10.…”

Section: For a Given Continuous Mapmentioning

confidence: 99%

“…Proof. If X is strongly dominated by a space M , then by Theorem 3.3(a) of [5] it follows that Y is strongly dominated by a space M .…”

Section: For a Given Continuous Mapmentioning

confidence: 99%

“…In Theorem 2.1 of [5] it was proved that in the class of Dieudonné complete spaces domination by a second countable space and the Lindelöf † property are equivalent. We will show that in the class of Lindelöf †-spaces strong domination by a second countable space and the Lindelöf p property are not equivalent.…”

Section: For a Given Continuous Mapmentioning

confidence: 99%

“…A space X is strongly dominated by a space M if there exists an M -ordered compact cover F such that for any compact K X there is F 2 F such that K F . Strong domination was introduced by Cascales, Orihuela and Tkachuk in [5].…”

Section: Introductionmentioning

confidence: 99%

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Vietoris topology on spaces dominated by second countable ones

Islas

Jardón

2015

Open Mathematics

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For a given space X let C.X / be the family of all compact subsets of X . A space X is dominated by a space M if X has an M -ordered compact cover, this means that there exists a familyA space X is strongly dominated by a space M if there exists an M -ordered compact cover F such that for any compact K X there is F 2 F such that K F . Let K.X / D C.X / n f;g be the set of all nonempty compact subsets of a space X endowed with the Vietoris topology. We prove that a space X is strongly dominated by a space M if and only if K.X / is strongly dominated by M and an example is given of a -compact space X such that K.X / is not Lindelöf †. It is stablished that if the weight of a scattered compact space X is not less than c, then the spaces C p .K.X // and K.C p .X// are not Lindelöf †. We show that if X is the one-point compactification of a discrete space, then the hyperspace K.X / is semi-Eberlein compact.

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Section: For a Given Continuous Mapmentioning

confidence: 97%

Section: For a Given Continuous Mapmentioning

confidence: 99%

“…Proof. If X is strongly dominated by a space M , then by Theorem 3.3(a) of [5] it follows that Y is strongly dominated by a space M .…”

Section: For a Given Continuous Mapmentioning

confidence: 99%

Section: For a Given Continuous Mapmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Vietoris topology on spaces dominated by second countable ones

Islas

Jardón

2015

Open Mathematics

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Bounded sets structure of CpX and quasi‐(DF)‐spaces

Ferrando

Gabriyelyan

Ka̧kol

2019

Mathematische Nachrichten

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For wide classes of locally convex spaces, in particular, for the space Cpfalse(Xfalse) of continuous real‐valued functions on a Tychonoff space X equipped with the pointwise topology, we characterize the existence of a fundamental bounded resolution (i.e., an increasing family of bounded sets indexed by the irrationals which swallows the bounded sets). These facts together with some results from Grothendieck's theory of (DF)‐spaces have led us to introduce quasi‐(DF)‐spaces, a class of locally convex spaces containing (DF)‐spaces that preserves subspaces, countable direct sums and countable products. Regular (LM)‐spaces as well as their strong duals are quasi‐(DF)‐spaces. Hence the space of distributions D′false(normalΩfalse) provides a concrete example of a quasi‐(DF)‐space not being a (DF)‐space. We show that Cpfalse(Xfalse) has a fundamental bounded resolution if and only if Cpfalse(Xfalse) is a quasi‐(DF)‐space if and only if the strong dual of Cpfalse(Xfalse) is a quasi‐(DF)‐space if and only if X is countable. If X is metrizable, then Ckfalse(Xfalse) is a quasi‐(DF)‐space if and only if X is a σ‐compact Polish space.

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The Mathematical Research of Juan Carlos Ferrando

Pellicer

2023

Springer Proceedings in Mathematics &Amp; Statistics

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Domination by second countable spaces and Lindelöf Σ-property

Cited by 29 publications

References 14 publications

Vietoris topology on spaces dominated by second countable ones

Vietoris topology on spaces dominated by second countable ones

Bounded sets structure of CpX and quasi‐(DF)‐spaces

The Mathematical Research of Juan Carlos Ferrando

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