Inner-model reflection principles

February 2, 2019

Typical reflection principles in set theory are concerned with the height of the universe, or the relative height of certain stages. The resemblance between stages or between the universe itself and some of these stages is a very useful guiding principle that serves us to motivate large cardinal statements and many consequences of forcing axioms.

It is natural to wonder about similar reflection principles concerned instead with the width of the universe. In our paper Inner-model reflection principlesNeil BartonGunter FuchsJoel David HamkinsJonas ReitzRalf Schindler and I consider precisely this kind of reflection. Say that the inner-model reflection principle holds if and only if for any set a, any first-order property \varphi(a) true in the universe already holds in some proper inner model containing a as an element.

We establish the consistency of the principle relative to ZFC. In fact, we build a model of the stronger ground-model reflection principle, where we further require that any such first-order \varphi(a) reflects to a ground of V, that is, an inner model W with a\in W such that V is a set-generic extension of W. A formal advantage of this principle is that, using results in what we now call set-theoretic geology, ground-model reflection is formalizable as a first-order schema. Inner-model reflection, on the other hand, seems to genuinely require a second-order formalization. It is still open whether this is indeed the case, in our paper we explain some of the difficulties in showing this.

The paper studies the principle under large cardinals and forcing axioms, and compares it with other statements considered in recent years, such as the maximality principle or the inner model hypothesis. The most technically involved and interesting results in the paper show that inner-model reflection and even ground-model reflection hold in certain fine-structural inner models but also that this requires large cardinals, and that the large cardinal requirements differ for both principles (precisely a proper class of Woodin cardinals is needed for ground-model reflection).

Curiously, the paper started as a series of informal exchanges in response to a question on math.stackexchange.

See also here. The paper will appear in Studia Logica. Meanwhile, it can be accessed on the arXiv, or in my papers page.

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Shehzad Ahmed – Coanalytic determinacy and sharps

January 12, 2015

Shehzad is my most recent student, having completed his M.S. thesis on May last year. He is currently pursuing his PhD at Ohio University. His page is here, and he also keeps a blog.

Shehzad Ahmed

Shehzad

His thesis, \mathbf \Pi^1_1-determinacy and sharps, is a survey of the Harrington-Martin theorem, showing the equivalence between a definable fragment of determinacy, and a large cardinal hypothesis.

After the fold, I review the basic notions, and give the tiniest of hints of what the theorem is and how its proof goes. Since the material is technical, the post is not really self-contained.

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