The Destruction of the Axiom of Determinacy by Forcings on $\mathbb{R}$ when $\Theta$ is Regular

Stephen Jackson

The Destruction of the Axiom of Determinacy by Forcings on R when is Regular

Abstract

ZF + AD proves that for all nontrivial forcings P on a wellorderable set of cardinality less than , 1P P AD. ZF + AD + is regular proves that for all nontrivial forcing P which is a surjective image of R, 1P P AD. In particular, ZF + AD + V = L(R) proves that for every nontrivial forcing P ∈ L(R), 1P P AD.

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