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    The Continuum Hypothesis is independent of ZFC, as proved... — Carmelics
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    Home/Modality & Possibility
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    Supports→The semantics of second-order logic depend on metatheoretic set theory so deeply that questions independent of ZFC can determine the truth or falsity of second-order sentences in a model.

    The Continuum Hypothesis is independent of ZFC, as proved by Cohen in 1963.

    Modality & PossibilityTruth & Knowledge
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    The semantics of second-order logic depend on metatheoretic set theory so deeply...There exists a sentence θ_CH of the empty vocabulary that has a model if and onl...There exists a sentence θ_¬CH of the empty vocabulary that has a model if and on...

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    The Continuum Hypothesis is independent of ZFC88%The Continuum Hypothesis is independent of ZFC (ZFC cannot decide whet...84%P ≠ NP is unlikely to be independent of Peano Arithmetic or ZFC.83%Therefore A is not causally independent of B.82%

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    Let \(\theta_{\le}(P,R)\) be the formula \[ \exists F\left(\forall x\,\forall y\left( (F(x)=F(y)\to x=y) \land(P(x)\to R(F(x)) \right)\right). \] Now \(\mm\models_s\theta_\le(P,R)\) if and only if \(|s(P)|\le |s(R)|\). Let \(\theta_{\textrm{EQ}}(P,R)\) be the formula \(\theta_{{\le}}(P,R)\land \theta_{{\le}}(R,P)\). Now \(\mm\models_s\phi(P,R)\) if and only if \(|s(P)|=|s(R)|\). Let \(\theta'_{\textrm{EC}}(Y)\) be \[ \exists F\left( \forall x\,\forall y((F(x)=F(y)\to x=y)\land R(F(x)))

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