Published February 4, 2026
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The Ultimate L Conjecture and Inner Models for Supercompact Cardinals
Description
The Inner Model Program, initiated by Gödel's construction of L, seeks to provide canonical, fine-structural inner models for large cardinal axioms. While successful up to the level of Woodin cardinals, the program faces a significant barrier at the level of supercompact cardinals due to the complexity of iteration strategies. This paper examines W. Hugh Woodin's Ultimate-L Conjecture, which posits the existence of a weak extender model for a supercompact cardinal that satisfies V = Ultimate-L. We analyze the structural consequences of this conjecture, including the HOD Dichotomy, the Universality Theorem for weak extender models, and the resolution of the Continuum Hypothesis. Furthermore, we discuss the necessity of shifting from pure extender models to strategic extender models to accommodate the combinatorics of supercompactness, thereby bridging the gap between current inner model theory and the transfinite hierarchy of large cardinals.
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