Repelling a Prussian charge with a solution to a paradox of Dubins

Synthese 195 (1) (2018)
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Abstract

Pruss uses an example of Lester Dubins to argue against the claim that appealing to hyperreal-valued probabilities saves probabilistic regularity from the objection that in continuum outcome-spaces and with standard probability functions all save countably many possibilities must be assigned probability 0. Dubins’s example seems to show that merely finitely additive standard probability functions allow reasoning to a foregone conclusion, and Pruss argues that hyperreal-valued probability functions are vulnerable to the same charge. However, Pruss’s argument relies on the rule of conditionalisation, but I show that in examples like Dubins’s involving nonconglomerable probabilities, conditionalisation is self-defeating.

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2016

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10.1007/s11229-016-1205-y

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Colin Howson
Last affiliation: London School of Economics

Citations of this work

Putting on the Garber Style? Better Not.Colin Howson - 2017 - Philosophy of Science 84 (4):659-676.

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References found in this work

Accuracy and Coherence: Prospects for an Alethic Epistemology of Partial Belief.James M. Joyce - 2009 - In Franz Huber & Christoph Schmidt-Petri (eds.), Degrees of belief. London: Springer. pp. 263-297.

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