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A maximal bounded forcing axiom

Published online by Cambridge University Press:  12 March 2014

David Asperó*
Affiliation:
Departament De Lògica, Història I Filosofia De La Ciència, Universitat De Barcelona, Baldiri I Reixach, S/N, 08028 Barcelona, Catalonia, Spain, E-mail: [email protected]
*
Institut für formale Logik, Universität Wien, Währingerstrasse 25, 1090 Wien, Austria, [email protected]

Abstract

After presenting a general setting in which to look at forcing axioms, we give a hierarchy of generalized bounded forcing axioms that correspond level by level, in consistency strength, with the members of a natural hierarchy of large cardinals below a Mahlo. We give a general construction of models of generalized bounded forcing axioms. Then we consider the bounded forcing axiom for a class of partially ordered sets Γ1 such that, letting Γ0 be the class of all stationary-set-preserving partially ordered sets, one can prove the following:

(a) Γ0 ⊆ Γ1,

(b) Γ0 = Γ1 if and only if NSω1 is ℵ1-dense.

(c) If P ∉ Γ1, then BFA({P}) fails.

We call the bounded forcing axiom for Γ1Maximal Bounded Forcing Axiom (MBFA). Finally we prove MBFA consistent relative to the consistency of an inaccessible Σ2-correct cardinal which is a limit of strongly compact cardinals.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 2002

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References

REFERENCES

[A]Asperó, D., Bounded forcing axioms and the continuum, Ph.D. thesis, U. Barcelona, 2000.Google Scholar
[B]Bagaria, J., Bounded forcing axioms as principles of generic absoluteness, Archive for Mathematical Logic, vol. 39 (2000), pp. 393401.CrossRefGoogle Scholar
[B-Fr]Bagaria, J. and Friedman, S., Generic absoluteness, to appear in Annals of Pure and Applied Logic.Google Scholar
[Bau-H-K]Baumgartner, J., Harrington, L., and Kleinberg, S., Adding a closed unbounded set, this Journal, vol. 41 (1976), pp. 481482.Google Scholar
[D]Devlin, K., Constructibility, Springer-Verlag, Berlin, 1984.CrossRefGoogle Scholar
[F-M-Sh]Foreman, M., Magidor, M., and Shelah, S., Martins Maximum, saturated ideals, and non-regular ultrafilters. Part I, Annals of Mathematics, vol. 127 (1988), pp. 147.CrossRefGoogle Scholar
[G-S]Goldstern, M. and Shelah, S., The bounded proper forcing axiom, this Journal, vol. 60 (1995), pp. 5873.Google Scholar
[Ku]Kunen, K., Set theory. An introduction to independence proofs, North-Holland, Amsterdam, 1980.Google Scholar
[M]Miyamoto, T., Localized reflecting cardinals and weak segments of PFA, preprint.Google Scholar
[S]Shelah, S., Proper and improper forcing, Perspectives in mathematical logic, Springer-Verlag, Berlin, 1998.CrossRefGoogle Scholar
[St-V]Stavi, J. and Väänänen, J., Reflection principles for the continuum, preprint.Google Scholar
[Tl]Todorčević, S., A note on the proper forcing axiom, Axiomatic set theory, AMS, Providence, 1984, pp. 209218.CrossRefGoogle Scholar
[T2]Todorčević, S., Localized reflection and fragments of PFA, 1999, seminar notes.Google Scholar
[W]Woodin, H., The axiom of determinacy, forcing axioms, and the nonstationary ideal, De Gruyter Series in Logic and its Applications, no. 1, Berlin, New York, 1999.CrossRefGoogle Scholar