Let 𝑛 ≥ 1 and assume that there is a Woodin cardinal. For 𝑥 ∈ ℝ let
𝛼ₓ be the least 𝛽 such that
L_β[𝑥] models Σ_n-KP + ∃κ (“κ is inaccessible and κ^+ exists”).
We adapt the analysis of HOD^{L[x,G]} as a strategy mouse to L_{α_x}[x, G] for
a cone of reals x. That is, we identify a mouse M^{n-ad} and define a class
H ⊆ L_{α_x}[x, G] as a natural analogue of HOD^{L[x,G]} ⊆ L[x, G], and show
that H = M_∞[Σ_0], where M_∞ is an iterate of M^{n-ad} and Σ_0 a fragment
of its iteration strategy.
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Projekttitel:
Determiniertheit und Woodin Limes von Woodin Kardinalzahlen: Y1498 (FWF - Österr. Wissenschaftsfonds)
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Projekt (extern):
Deutsche Forschungsgemeinschaft (DFG, German Research Foundation)
