Clubsuit

In mathematics, and particularly in axiomatic set theory, S (clubsuit) is a family of combinatorial principles that are a weaker version of the corresponding ◊S; it was introduced in 1975 by Adam Ostaszewski.[1]

Definition

For a given cardinal number κ {\displaystyle \kappa } and a stationary set S κ {\displaystyle S\subseteq \kappa } , S {\displaystyle \clubsuit _{S}} is the statement that there is a sequence A δ : δ S {\displaystyle \left\langle A_{\delta }:\delta \in S\right\rangle } such that

  • every Aδ is a cofinal subset of δ
  • for every unbounded subset A κ {\displaystyle A\subseteq \kappa } , there is a δ {\displaystyle \delta } so that A δ A {\displaystyle A_{\delta }\subseteq A}

ω 1 {\displaystyle \clubsuit _{\omega _{1}}} is usually written as just {\displaystyle \clubsuit } .

♣ and ◊

It is clear that ◊ ⇒ ♣, and it was shown in 1975 that ♣ + CH ⇒ ◊; however, Saharon Shelah gave a proof in 1980 that there exists a model of ♣ in which CH does not hold, so ♣ and ◊ are not equivalent (since ◊ ⇒ CH).[2]

See also

  • Club set

References

  1. ^ Ostaszewski, Adam J. (1975). "On countably compact perfectly normal spaces". Journal of the London Mathematical Society. 14: 505–516. doi:10.1112/jlms/s2-14.3.505.
  2. ^ Shelah, S. (1980). "Whitehead groups may not be free even assuming CH, II". Israel Journal of Mathematics. 35: 257–285. doi:10.1007/BF02760652.