Enregistré dans:
| Auteur principal: | |
|---|---|
| Format: | Preprint |
| Publié: |
2021
|
| Sujets: | |
| Accès en ligne: | https://arxiv.org/abs/2112.00535 |
| Tags: |
Ajouter un tag
Pas de tags, Soyez le premier à ajouter un tag!
|
Table des matières:
- For which infinite cardinals $κ$ is there a partition of the real line $\mathbb R$ into precisely $κ$ Borel sets? Hausdorff famously proved that there is a partition of $\mathbb R$ into $\aleph_1$ Borel sets. But other than this, we show that the spectrum of possible sizes of partitions of $\mathbb R$ into Borel sets can be fairly arbitrary. For example, given any $A \subseteq ω$ with $0,1 \in A$, there is a forcing extension in which $A = \{ n :\, \text{there is a partition of }\mathbb R\text{ into }\aleph_n\text{ Borel sets}\}$. We also look at the corresponding question for partitions of $\mathbb R$ into closed sets. We show that, like with partitions into Borel sets, the set of all uncountable $κ$ such that there is a partition of $\mathbb R$ into precisely $κ$ closed sets can be fairly arbitrary.