Rédei, Miklós and Gyenis, Zalán (2021) The Maxim of Probabilism -- with special regard to Reichenbach. [Preprint]

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Abstract

It is shown that by realizing the isomorphism features of the frequency and geometric interpretations of probability, Reichenbach comes very close to the idea of identifying mathematical probability theory with measure theory in his 1949 work on foundations of probability. Some general features of Reichenbach's axiomatization of probability theory are pointed out as likely obstacles that prevented him making this conceptual move. The role of isomorphisms of Kolmogorovian probability measure spaces is specified in what we call the ``Maxim of Probabilism'', which states that a necessary condition for a concept to be probabilistic is its invariance with respect to measure-theoretic isomorphisms. The functioning of the Maxim of Probabilism is illustrated by the example of conditioning via conditional expectations.

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Item Type:	Preprint
Creators:	Creators Email ORCID Rédei, Miklós M.Redei@lse.ac.uk Gyenis, Zalán gyz@renyi.hu
Subjects:	General Issues > History of Philosophy of Science Specific Sciences > Probability/Statistics
Depositing User:	Zalán Gyenis
Date Deposited:	29 Apr 2021 15:12
Last Modified:	29 Apr 2021 15:12
Item ID:	18957
Subjects:	General Issues > History of Philosophy of Science Specific Sciences > Probability/Statistics
Date:	27 April 2021
URI:	https://philsci-archive.pitt.edu/id/eprint/18957

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