The equivalence of two definitions of sequential pseudocompactness

Lipparini, Paolo

doi:10.4995/agt.2016.4616

Cited by 3 publications

(4 citation statements)

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“…2 One of the authors introduced this notion a few years ago as a natural property intermediate between feeble and sequential compactness, which may be useful in some applications in topological algebra. Indeed, for instance, Proposition 1.10. by Artico et al [4] combined with Theorem 1.1 by Lipparini [17] states that that each T 0 feebly compact topological group is sequentially feebly compact. But later we found that it is a known property, even with the same name.…”

Section: Definitions and Relationsmentioning

confidence: 99%

“…In general topology we often investigate different classes of compact-like spaces and relations between them, see, for instance, basic [11,Chap. 3] and general works [9], [19], [23], [22], [17]. We consider the present paper as a next small step in this quest.…”

Section: Definitions and Relationsmentioning

confidence: 99%

“…1.8], where are used pairwise disjoint open sets instead. Lipparini proved in[17] that these notions are equivalent.…”

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confidence: 99%

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On old and new classes of feebly compact spaces

Гутік¹,

Ravsky²

2019

vmm

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Section: Definitions and Relationsmentioning

confidence: 99%

Section: Definitions and Relationsmentioning

confidence: 99%

See 1 more Smart Citation

On old and new classes of feebly compact spaces

Гутік¹,

Ravsky²

2019

vmm

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“…También, S. García-Ferreira y A. H. Tomita muestran en [20] la existencia de un espacio secuencialmente pseudocompacto que no es secuencialmente compacto. P. Lipparini demuestra en [25] que la propiedad (P) es equivalente a la siguiente propiedad en la clase de espacios topológicos: (P 0 ) Para toda sucesión hU n i de conjuntos abiertos no vacíos de X, existe un subconjunto infinito J ⇢ ! y un punto p 2 X tal que el conjunto {n 2 J : W \ U n = ;} es finito para toda vecindad W de p.…”

Section: Capítulo 4 Espacios Secuencialmente Tenuemente Compactosunclassified

Maximalidad de propiedades que generalizan la compacidad

Martínez-Cadena¹,

Alberto²

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Selective sequential pseudocompactness

Dorantes-Aldama

Shakhmatov

2017

Topology and its Applications

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We say that a topological space X is selectively sequentially pseudocompact (SSP for short) if for every sequence (U_n) of non-empty open subsets of X, one can choose a point x_n in U_n for every n in such a way that the sequence (x_n) has a convergent subsequence. We show that the class of SSP spaces is closed under taking arbitrary products and continuous images, contains the class of all dyadic spaces and forms a proper subclass of the class of strongly pseudocompact spaces introduced recently by Garc\'ia-Ferreira and Ortiz-Castillo. We investigate basic properties of this new class and its relations with known compactness properties. We prove that every omega-bounded (=the closure of which countable set is compact) group is SSP, while compact spaces need not be SSP. Finally, we construct SSP group topologies on both the free group and the free Abelian group with continuum-many generators

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The equivalence of two definitions of sequential pseudocompactness

Abstract: We show that two possible definitions of sequential pseudocompactness are equivalent, and point out some consequences.2010 MSC: Primary 54D20; Secondary 54B10.

Cited by 3 publications

References 2 publications

On old and new classes of feebly compact spaces

On old and new classes of feebly compact spaces

Maximalidad de propiedades que generalizan la compacidad

Selective sequential pseudocompactness

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