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The downward directed grounds hypothesis and very large cardinals
Journal of Mathematical Logic 17 (2):1750009 (2017)
Abstract
A transitive model M of ZFC is called a ground if the universe V is a set forcing extension of M. We show that the grounds ofV are downward set-directed. Consequently, we establish some fundamental theorems on the forcing method and the set-theoretic geology. For instance, the mantle, the intersection of all grounds, must be a model of ZFC. V has only set many grounds if and only if the mantle is a ground. We also show that if the universe has some very large cardinal, then the mantle must be a ground.Other Versions
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Citations of this work
The modal logic of set-theoretic potentialism and the potentialist maximality principles.Joel David Hamkins & Øystein Linnebo - 2022 - Review of Symbolic Logic 15 (1):1-35.
In search of ultimate- L the 19th midrasha mathematicae lectures.W. Hugh Woodin - 2017 - Bulletin of Symbolic Logic 23 (1):1-109.
Universism and extensions of V.Carolin Antos, Neil Barton & Sy-David Friedman - 2021 - Review of Symbolic Logic 14 (1):112-154.
A Reconstruction of Steel’s Multiverse Project.Penelope Maddy & Toby Meadows - 2020 - Bulletin of Symbolic Logic 26 (2):118-169.
References found in this work
Set-theoretic geology.Gunter Fuchs, Joel David Hamkins & Jonas Reitz - 2015 - Annals of Pure and Applied Logic 166 (4):464-501.
Certain very large cardinals are not created in small forcing extensions.Richard Laver - 2007 - Annals of Pure and Applied Logic 149 (1-3):1-6.
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