On the continuity of factorizations

dc.contributor.authorComfort, W.W.es_ES
dc.contributor.authorGotchev, Ivan S.es_ES
dc.contributor.authorRecoder-Nuñez, Luises_ES
dc.date.accessioned2017-09-05T11:50:25Z
dc.date.available2017-09-05T11:50:25Z
dc.date.issued2008-10-01
dc.date.updated2017-09-05T11:04:30Z
dc.description.abstract[EN] Let {Xi : i ∈ I} be a set of sets, XJ :=Пi∈J Xi when Ø ≠ J ⊆ I; Y be a subset of XI , Z be a set, and f : Y → Z. Then f is said to depend on J if p, q ∈ Y , pJ = qJ ⇒ f(p) = f(q); in this case, fJ : πJ [Y ] → Z is well-defined by the rule f = fJ ◦ πJ|Y When the Xi and Z are spaces and f : Y → Z is continuous with Y dense in XI , several natural questions arise: (a) does f depend on some small J ⊆ I? (b) if it does, when is fJ continuous? (c) if fJ is continuous, when does it extend to continuous fJ : XJ → Z? (d) if fJ so extends, when does f extend to continuous f : XI → Z? (e) if f depends on some J ⊆ I and f extends to continuous f : XI → Z, when does f also depend on J? The authors offer answers (some complete, some partial) to some of these questions, together with relevant counterexamples. Theorem 1. f has a continuous extension f : XI → Z that depends on J if and only if fJ is continuous and has a continuous extension fJ : XJ → Z. Example 1. For ω ≤ k ≤ c there are a dense subset Y of [0, 1]k and f ∈ C(Y, [0, 1]) such that f depends on every nonempty J ⊆ k, there is no J ∈ [k]<ω such that fJ is continuous, and f extends continuously over [0, 1]k. Example 2. There are a Tychonoff space XI, dense Y ⊆ XI, f ∈ C(Y ), and J ∈ [I]<ω such that f depends on J, πJ [Y ] is C-embedded in XJ , and f does not extend continuously over XI .en_EN
dc.description.accrualMethodSWORDes_ES
dc.description.bibliographicCitationComfort, W.; Gotchev, IS.; Recoder-Nuñez, L. (2008). On the continuity of factorizations. Applied General Topology. 9(2):263-280. https://doi.org/10.4995/agt.2008.1806es_ES
dc.description.issue2
dc.description.upvformatpfin280es_ES
dc.description.upvformatpinicio263es_ES
dc.description.volume9
dc.identifier.doi10.4995/agt.2008.1806
dc.identifier.eissn1989-4147
dc.identifier.issn1576-9402
dc.identifier.urihttps://riunet.upv.es/handle/10251/86442
dc.languageIngléses_ES
dc.publisherUniversitat Politècnica de València
dc.relation.ispartofApplied General Topology
dc.relation.publisherversionhttps://doi.org/10.4995/agt.2008.1806es_ES
dc.rightsReconocimiento - No comercial - Sin obra derivada (by-nc-nd)es_ES
dc.rights.accessRightsAbiertoes_ES
dc.subjectProduct spacees_ES
dc.subjectDense subspacees_ES
dc.subjectContinuous factorizationes_ES
dc.subjectContinuous extensions of mapses_ES
dc.titleOn the continuity of factorizationses_ES
dc.typeArtículoes_ES
dc.type.versioninfo:eu-repo/semantics/publishedVersiones_ES
dspace.entity.typePublication
upv.uuid2e8ec129-d5ac-4f29-9630-6cae5a9c8b4des_ES

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