Symmetry in Polyadic Inductive Logic

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Journal of Logic, Language and Information 21 (2):189-216 (2012)
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Abstract

A family of symmetries of polyadic inductive logic are described which in turn give rise to the purportedly rational Permutation Invariance Principle stating that a rational assignment of probabilities should respect these symmetries. An equivalent, and more practical, version of this principle is then derived

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10.1007/s10849-011-9143-z

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Jeffrey Paris
University of Manchester

Citations of this work

On the Strongest Principles of Rational Belief Assignment.J. B. Paris & A. Vencovská - forthcoming - Journal of Logic, Language and Information:1-26.

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References found in this work

Logical foundations of probability.Rudolf Carnap - 1950 - Chicago]: Chicago University of Chicago Press.
A Note on Binary Inductive Logic.C. J. Nix & J. B. Paris - 2007 - Journal of Philosophical Logic 36 (6):735-771.

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