Inner model operators in L

Annals of Pure and Applied Logic 101 (2-3):147-184 (2000)
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Abstract

An inner model operator is a function M such that given a Turing degree d, M is a countable set of reals, d M, and M has certain closure properties. The notion was introduced by Steel. In the context of AD, we study inner model operators M such that for a.e. d, there is a wellorder of M in L). This is related to the study of mice which are below the minimal inner model with ω Woodin cardinals. As a technical tool, we show that the alternative fine structure theory developed by Mitchell and Steel for mice with Woodin cardinals is equivalent to the traditional fine structure theory developed by Jensen for L

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10.1016/s0168-0072(99)00012-3

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References found in this work

Inner models with many Woodin cardinals.J. R. Steel - 1993 - Annals of Pure and Applied Logic 65 (2):185-209.
The fine structure of the constructible hierarchy.R. Björn Jensen - 1972 - Annals of Mathematical Logic 4 (3):229.
Projectively well-ordered inner models.J. R. Steel - 1995 - Annals of Pure and Applied Logic 74 (1):77-104.
HOD L(ℝ) is a Core Model Below Θ.John R. Steel - 1995 - Bulletin of Symbolic Logic 1 (1):75-84.

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