Choiceless large cardinals and set‐theoretic potentialism

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Mathematical Logic Quarterly 68 (4):409-415 (2022)
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Abstract

We define a potentialist system of ‐structures, i.e., a collection of possible worlds in the language of connected by a binary accessibility relation, achieving a potentialist account of the full background set‐theoretic universe V. The definition involves Berkeley cardinals, the strongest known large cardinal axioms, inconsistent with the Axiom of Choice. In fact, as background theory we assume just. It turns out that the propositional modal assertions which are valid at every world of our system are exactly those in the modal theory. Moreover, we characterize the worlds satisfying the potentialist maximality principle, and thus the modal theory, both for assertions in the language of and for assertions in the full potentialist language.

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10.1002/malq.202000026

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Joel David Hamkins
Oxford University

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Large cardinals beyond choice.Joan Bagaria, Peter Koellner & W. Hugh Woodin - 2019 - Bulletin of Symbolic Logic 25 (3):283-318.
A simple maximality principle.Joel Hamkins - 2003 - Journal of Symbolic Logic 68 (2):527-550.

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