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The independence of the prime ideal theorem from the order-extension principle
Journal of Symbolic Logic 64 (1):199-215 (1999)
Abstract
It is shown that the boolean prime ideal theorem BPIT: every boolean algebra has a prime ideal, does not follow from the order-extension principle OE: every partial ordering can be extended to a linear ordering. The proof uses a Fraenkel-Mostowski model, where the family of atoms is indexed by a countable universal-homogeneous boolean algebra whose boolean partial ordering has a `generic' extension to a linear ordering. To illustrate the technique for proving that the order-extension principle holds in the model we also study Mostowski's ordered model, and give a direct verification of OE there. The key technical point needed to verify OE in each case is the existence of a support structureLinks
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Citations of this work
Regular probability comparisons imply the Banach–Tarski Paradox.Alexander R. Pruss - 2014 - Synthese 191 (15):3525-3540.
Definably extending partial orders in totally ordered structures.Janak Ramakrishnan & Charles Steinhorn - 2014 - Mathematical Logic Quarterly 60 (3):205-210.
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