Fair infinite lotteries, qualitative probability, and regularity

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buir.contributor.authorDiBella, Nicholas
buir.contributor.orcidDiBella, Nicholas|0000-0002-3572-5672
dc.citation.epage844en_US
dc.citation.issueNumber4en_US
dc.citation.spage824en_US
dc.citation.volumeNumber89en_US
dc.contributor.authorDiBella, Nicholas
dc.date.accessioned2023-02-28T10:35:35Z
dc.date.available2023-02-28T10:35:35Z
dc.date.issued2022-02-11
dc.departmentDepartment of Philosophyen_US
dc.description.abstractA number of philosophers have thought that fair lotteries over countably infinite sets of outcomes are conceptually incoherent by virtue of violating countable additivity. In this article, I show that a qualitative analogue of this argument generalizes to an argument against the conceptual coherence of a much wider class of fair infinite lotteries—including continuous uniform distributions. I argue that this result suggests that fair lotteries over countably infinite sets of outcomes are no more conceptually problematic than continuous uniform distributions. Along the way, I provide a novel argument for a weak qualitative, epistemic version of regularity.en_US
dc.description.provenanceSubmitted by Zeliha Bucak Çelik (zeliha.celik@bilkent.edu.tr) on 2023-02-28T10:35:34Z No. of bitstreams: 1 Fair_infinite_lotteries,_qualitative_probability,_and_regularity.pdf: 265066 bytes, checksum: f19501927fd72b3dcdc08804e816839f (MD5)en
dc.description.provenanceMade available in DSpace on 2023-02-28T10:35:35Z (GMT). No. of bitstreams: 1 Fair_infinite_lotteries,_qualitative_probability,_and_regularity.pdf: 265066 bytes, checksum: f19501927fd72b3dcdc08804e816839f (MD5) Previous issue date: 2022-02-11en
dc.identifier.doihttps://doi.org/10.1017/psa.2022.4en_US
dc.identifier.eissn1539-767X
dc.identifier.issn0031-8248
dc.identifier.urihttp://hdl.handle.net/11693/111907
dc.language.isoEnglishen_US
dc.publisherCambridge University Pressen_US
dc.relation.isversionof10.1017/psa.2022.4en_US
dc.source.titlePhilosophy of Scienceen_US
dc.titleFair infinite lotteries, qualitative probability, and regularityen_US
dc.typeArticleen_US

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