Iterability for (transfinite) stacks
Abstract
We establish natural criteria under which normally iterable premice are iterable for stacks of normal trees. Let be a regular uncountable cardinal. Let and be an -sound premouse and be an -iteration strategy for (roughly, a normal -strategy). We define a natural condensation property for iteration strategies, "inflation condensation". We show that if has inflation condensation then is -iterable (roughly, is iterable for length stacks of normal trees each of length ), and moreover, we define a specific such strategy and a reduction of stacks via to normal trees via . If has the Dodd-Jensen property and then has inflation condensation. We also apply some of the techniques developed to prove that if has strong hull condensation (introduced independently by John Steel) and is -generic for an -cc forcing, then extends to an -strategy for with strong hull condensation, in the sense of . Moreover, this extension is unique. We deduce that if is -generic for a ccc forcing then and have the same -sound, -iterable premice which project to .
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