Please use this identifier to cite or link to this item: https://doi.org/10.1017/jsl.2021.15
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dc.titleFINDING DESCENDING SEQUENCES THROUGH ILL-FOUNDED LINEAR ORDERS
dc.contributor.authorGoh, Jun Le
dc.contributor.authorPauly, Arno
dc.contributor.authorValenti, Manlio
dc.date.accessioned2022-06-09T04:09:22Z
dc.date.available2022-06-09T04:09:22Z
dc.date.issued2021-06
dc.identifier.citationGoh, Jun Le, Pauly, Arno, Valenti, Manlio (2021-06). FINDING DESCENDING SEQUENCES THROUGH ILL-FOUNDED LINEAR ORDERS. The Journal of Symbolic Logic 86 (2) : 817-854. ScholarBank@NUS Repository. https://doi.org/10.1017/jsl.2021.15
dc.identifier.issn0022-4812
dc.identifier.issn1943-5886
dc.identifier.urihttps://scholarbank.nus.edu.sg/handle/10635/226819
dc.description.abstractIn this work we investigate the Weihrauch degree of the problem Decreasing Sequence () of finding an infinite descending sequence through a given ill-founded linear order, which is shared by the problem Bad Sequence () of finding a bad sequence through a given non-well quasi-order. We show that , despite being hard to solve (it has computable inputs with no hyperarithmetic solution), is rather weak in terms of uniform computational strength. To make the latter precise, we introduce the notion of the deterministic part of a Weihrauch degree. We then generalize and by considering -presented orders, where is a Borel pointclass or , , . We study the obtained -hierarchy and -hierarchy of problems in comparison with the (effective) Baire hierarchy and show that they do not collapse at any finite level.
dc.publisherCambridge University Press (CUP)
dc.sourceElements
dc.subjectWeihrauch reducibility
dc.subjectcomputable analysis
dc.subjectwell-quasiorders
dc.subjectreverse mathematics
dc.typeArticle
dc.date.updated2022-06-07T03:02:11Z
dc.contributor.departmentMATHEMATICS
dc.description.doi10.1017/jsl.2021.15
dc.description.sourcetitleThe Journal of Symbolic Logic
dc.description.volume86
dc.description.issue2
dc.description.page817-854
dc.published.statePublished
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