Super Black Boxes Revisited
Abstract
Let be cardinals, with and regular. Concentrating on a simple case, we say that the triple has a Super Black Box when the following holds. For some stationary and , where is a club of of order type , for every coloring with , there exists such that for every , for stationarily many , we have . In an earlier work, it was proved (along with much more) that for a class of cardinals this holds for many pairs . E.g.~ is large enough, and . However, the most interesting cases (at least with regards to Abelian groups) are (which have not been covered yet). Here we restrict ourselves to the case where is a {so-called} \emph{continuous coloring}, which includes the case where is computed from some This covers the cases we have in mind. We mainly prove results without any other caveats: e.g. For every regular and there exists such a . We also deal with having multiple {-s}, and the existence of quite free subsets of .
Cite
@article{arxiv.2602.09592,
title = {Super Black Boxes Revisited},
author = {Saharon Shelah},
journal= {arXiv preprint arXiv:2602.09592},
year = {2026}
}