When cardinals determine the power set: inner models and H\"artig quantifier logic

Abstract

We make use of some observations on the core model, for example assuming V=L [ E ], and that there is no inner model with a Woodin cardinal, and M is an inner model with the same cardinals as V, then V=M. We conclude in this latter situation that "x=P ( y )" is 1 ( Card ) where Card is a predicate true of just the infinite cardinals. It is known that this implies the validities of second order logic are reducible to VI the set of validities of the H\"artig quantifier logic. We draw some further conclusions on the L\"owenheim number, I of the latter logic: that if no L[E] model has a cardinal strong up to an -fixed point, and I is less than the least weakly inaccessible δ, then (i) I is a limit of measurable cardinals of K; (ii) the Weak Covering Lemma holds at δ.

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