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Fair Infinite Lotteries, Qualitative Probability, and Regularity

DiBella, Nicholas (2021) Fair Infinite Lotteries, Qualitative Probability, and Regularity. [Preprint]

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Abstract

A 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 paper, 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.

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Item Type: Preprint
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DiBella, Nicholas0000-0002-3572-5672
Keywords: Fair Infinite Lotteries, Qualitative Probability, Regularity
Subjects: Specific Sciences > Probability/Statistics
Depositing User: Nicholas DiBella
Date Deposited: 21 Aug 2021 13:19
Last Modified: 21 Aug 2021 13:19
Item ID: 19470
Subjects: Specific Sciences > Probability/Statistics
Date: 2021
URI: https://philsci-archive.pitt.edu/id/eprint/19470

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