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Main Authors: Lietz, Andreas, Winkel, Jeroen
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2411.06002
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author Lietz, Andreas
Winkel, Jeroen
author_facet Lietz, Andreas
Winkel, Jeroen
contents Picture countably many logicians all wearing a hat in one of $κ$-many colours. They each get to look at finitely many other hats and afterwards make finitely many guesses for their own hat's colour. For which $κ$ can the logicians guarantee that at least one of them guesses correctly? This will be the archetypical hat problem we analyse and solve here. We generalise this by varying the amount of logicians as well as the number of allowed guesses and describe exactly for which combinations the logicians have a winning strategy. We also solve these hat problems under the additional restriction that their vision is restrained in terms of a partial order. Picture e.g.~countably many logicians standing on the real number line and each logician is only allowed to look at finitely many others in front of them. In many cases, the least $κ$ for which the logicians start losing can be described by an instance of the free subset property which in turn is connected to large cardinals. In particular, $\mathrm{ZFC}$ can sometimes not decide whether or not the logicians can win for every possible set of colours.
format Preprint
id arxiv_https___arxiv_org_abs_2411_06002
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Infinite Hat Problems and Large Cardinals
Lietz, Andreas
Winkel, Jeroen
Logic
03E02, 03E55
Picture countably many logicians all wearing a hat in one of $κ$-many colours. They each get to look at finitely many other hats and afterwards make finitely many guesses for their own hat's colour. For which $κ$ can the logicians guarantee that at least one of them guesses correctly? This will be the archetypical hat problem we analyse and solve here. We generalise this by varying the amount of logicians as well as the number of allowed guesses and describe exactly for which combinations the logicians have a winning strategy. We also solve these hat problems under the additional restriction that their vision is restrained in terms of a partial order. Picture e.g.~countably many logicians standing on the real number line and each logician is only allowed to look at finitely many others in front of them. In many cases, the least $κ$ for which the logicians start losing can be described by an instance of the free subset property which in turn is connected to large cardinals. In particular, $\mathrm{ZFC}$ can sometimes not decide whether or not the logicians can win for every possible set of colours.
title Infinite Hat Problems and Large Cardinals
topic Logic
03E02, 03E55
url https://arxiv.org/abs/2411.06002