English

Iterability for (transfinite) stacks

Logic 2025-04-11 v4

Abstract

We establish natural criteria under which normally iterable premice are iterable for stacks of normal trees. Let Ω\Omega be a regular uncountable cardinal. Let m<ωm<\omega and MM be an mm-sound premouse and Σ\Sigma be an (m,Ω+1)(m,\Omega+1)-iteration strategy for MM (roughly, a normal (Ω+1)(\Omega+1)-strategy). We define a natural condensation property for iteration strategies, "inflation condensation". We show that if Σ\Sigma has inflation condensation then MM is (m,Ω,Ω+1)(m,\Omega,\Omega+1)^*-iterable (roughly, MM is iterable for length Ω\leq\Omega stacks of normal trees each of length <Ω{<\Omega}), and moreover, we define a specific such strategy Σst\Sigma^{\mathrm{st}} and a reduction of stacks via Σst\Sigma^{\mathrm{st}} to normal trees via Σ\Sigma. If Σ\Sigma has the Dodd-Jensen property and card(M)<Ω\mathrm{card}(M)<\Omega then Σ\Sigma has inflation condensation. We also apply some of the techniques developed to prove that if Σ\Sigma has strong hull condensation (introduced independently by John Steel) and GG is VV-generic for an Ω\Omega-cc forcing, then Σ\Sigma extends to an (m,Ω+1)(m,\Omega+1)-strategy Σ+\Sigma^+ for MM with strong hull condensation, in the sense of V[G]V[G]. Moreover, this extension is unique. We deduce that if GG is VV-generic for a ccc forcing then VV and V[G]V[G] have the same ω\omega-sound, (ω,Ω+1)(\omega,\Omega+1)-iterable premice which project to ω\omega.

Keywords

Cite

@article{arxiv.1811.03880,
  title  = {Iterability for (transfinite) stacks},
  author = {Farmer Schlutzenberg},
  journal= {arXiv preprint arXiv:1811.03880},
  year   = {2025}
}

Comments

120 pages. This is the author accepted version. Changes this version: minor corrections and minor improvements to exposition

R2 v1 2026-06-23T05:10:13.572Z