Maximum Entropy and Probability Kinematics Constrained by Conditionals

Entropy 17 (4):1690-1700 (2015)
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Abstract

Two open questions of inductive reasoning are solved: (1) does the principle of maximum entropy (pme) give a solution to the obverse Majerník problem; and (2) is Wagner correct when he claims that Jeffrey’s updating principle (jup) contradicts pme? Majerník shows that pme provides unique and plausible marginal probabilities, given conditional probabilities. The obverse problem posed here is whether pme also provides such conditional probabilities, given certain marginal probabilities. The theorem developed to solve the obverse Majerník problem demonstrates that in the special case introduced by Wagner pme does not contradict jup, but elegantly generalizes it and offers a more integrated approach to probability updating.

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Author's Profile

Stefan Lukits
British Columbia Institute of Technology

Citations of this work

Maximum Entropy Applied to Inductive Logic and Reasoning.Jürgen Landes & Jon Williamson (eds.) - 2015 - Ludwig-Maximilians-Universität München.

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References found in this work

Bayesian conditionalisation and the principle of minimum information.P. M. Williams - 1980 - British Journal for the Philosophy of Science 31 (2):131-144.
Probability kinematics and commutativity.Carl G. Wagner - 2002 - Philosophy of Science 69 (2):266-278.

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