Measures in Mice
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This thesis analyses extenders in fine structural mice. Kunen showed that in the inner model for one measurable cardinal, there is a unique measure. This result is generalized, in various ways, to mice below a superstrong cardinal. The analysis is then used to show that certain tame mice satisfy $V=\mathsf{HOD}$. In particular, the approach proides a new proof of this result for the inner model $M_n$ for $n$ Woodin cardinals. It is also shown that in $M_n$, all homogeneously Suslin sets of reals are $\mathbf{\Delta}^1_{n+1}$.
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On the Intermediate Models of Strongly Compact Prikry Forcing
The authors characterize projections of strongly compact Prikry forcing using κ-complete fine measures, generalize prior results on κ-distributive forcings, and give Rudin-Keisler-style criteria for projections.
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