Sacks forcing collapses $\frak c$ to $\frak b$

Simon, Petr

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Sacks forcing collapses $\frak c$ to $\frak b$. (English). Commentationes Mathematicae Universitatis Carolinae, vol. 34 (1993), issue 4, pp. 707-710

MSC: 03C25, 03E25, 03E40, 03G05, 06A07, 06E05 | MR 1263799 | Zbl 0797.03053

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Keywords:
perfect tree; distributivity of Boolean algebra; almost disjoint refinement

Summary:
We shall prove that Sacks algebra is nowhere $(\frak b, \frak c, \frak c)$-distributive, which implies that Sacks forcing collapses $\frak c$ to $\frak b$.

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References:

[A] Abraham U.: A minimal model for $\lnot$CH: iteration of Jensen's reals. Trans. Amer. Math. Soc. (1984), 281 657-674. MR 0722767

[BS] Balcar B., Simon P.: Disjoint Refinement. in: Handbook of Boolean Algebra, Elsevier Sci. Publ. (1989), 333-386. MR 0991597

[JMS] Judah H., Miller A.W., Shelah S.: Sacks forcing, Laver forcing and Martin's axiom. Arch. Math. Logic (1992), 31 145-161. MR 1147737 | Zbl 0755.03026

[RS] Rosłanowski A., Shelah S.: More forcing notions imply diamond. (preprint January 4, 1993).

[S] Sacks G.E.: Forcing with perfect closed sets. Axiomatic set theory, Proc. Symp. Pure Math. 13 (1971), 331-355. MR 0276079 | Zbl 0226.02047

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