Tychonoff Products of Two-Element Sets and Some Weakenings of the Boolean Prime Ideal Theorem

• Autorzy: Kyriakos Keremedis
• Języki publikacji: EN

Abstrakty

EN

Let X be an infinite set, and 𝓟(X) the Boolean algebra of subsets of X. We consider the following statements:
BPI(X): Every proper filter of 𝓟(X) can be extended to an ultrafilter.
UF(X): 𝓟(X) has a free ultrafilter.
We will show in ZF (i.e., Zermelo-Fraenkel set theory without the Axiom of Choice) that the following four statements are equivalent:
(i) BPI(ω).
(ii) The Tychonoff product $2^{ℝ}$, where 2 is the discrete space {0,1}, is compact.
(iii) The Tychonoff product $[0,1]^{ℝ}$ is compact.
(iv) In a Boolean algebra of size ≤ |ℝ| every filter can be extended to an ultrafilter.
We will also show that in ZF, UF(ℝ) does not imply BPI(ℝ). Hence, BPI(ℝ) is strictly stronger than UF(ℝ). We do not know if UF(ω) implies BPI(ω) in ZF.
Furthermore, we will prove that the axiom of choice for sets of subsets of ℝ does not imply BPI(ℝ) and, in addition, the axiom of choice for well orderable sets of non-empty sets does not imply BPI(ω ).

Kategorie tematyczne

• 03E25: Axiom of choice and related propositions
• 54D30: Compactness
• 54B10: Product spaces
• 03G05: Boolean algebras

• Wydawca: Institute of Mathematics Polish Academy of Sciences
• Czasopismo: Bulletin of the Polish Academy of Sciences. Mathematics
• Rocznik: 2005
• Tom: 53
• Numer: 4
• Strony: 349-359

Daty

wydano

2005

Twórcy

autor

Kyriakos Keremedis

• Department of Mathematics, University of the Aegean, 83 200 Karlovassi (Samos), Greece

Identyfikatory

DOI

10.4064/ba53-4-1