Global Square and Mutual Stationarity at the Alephn
Abstract
We show using a proof of the Global Square property in Core Models below a measurable of Mitchell order o(kappa)=kappa++ (a result originally due to Jensen & Zeman) that Foreman and Magidor's Mutual Stationarity property MS(Alephn (1<n<omega), Cof(omega1)) implies the existence of inner models with measurables of high Mitchell order. This MS property states that any sequence of independently chosen stationary subsets Sn of the Alephn (of fixed cofinality omega1) is mutually stationary below alephomega.
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