Proper forcing axiom

In the mathematical field of set theory, the proper forcing axiom ("PFA") is a significant strengthening of Martin's axiom, where forcings with the countable chain condition (ccc) are replaced by proper forcings.

Statement

A forcing or partially ordered set P is proper if for all regular uncountable cardinals $lambda$ , forcing with P preserves stationary subsets of $[lambda] ^omega$ .

The proper forcing axiom asserts that if P is proper and D_α is a dense subset of P for each α<ω₁, then there is a filter G&sube;P such that D_α ∩ G is nonempty for all α<ω₁.

The class of proper forcings, to which PFA can be applied, is rather large. For example, standard arguments show that if P is ccc or ω-closed, then P is proper. If P is a countable support iteration of proper forcings, then P is proper. In general, proper forcings preserve $aleph_1$ .

Consequences

PFA directly implies its version for ccc forcings, Martin's axiom. In cardinal arithmetic, PFA implies $2^{aleph_0} = aleph_2$ . PFA implies any two $aleph_1$ -dense subsets of R are isomorphic, any two Aronszajn trees are club-isomorphic, and every automorphism of $P(omega)$ /fin is trivial. PFA implies that the Singular Cardinals Hypothesis holds. An especially notable consequence proved by John R. Steel is that the axiom of determinacy holds in L(R), the smallest inner model containing the real numbers. Another consequence is the failure of square principles and hence existence of inner models with many Woodin cardinals.

Consistency strength

If there is a supercompact cardinal, then there is a model of set theory in which PFA holds. The proof uses the fact that proper forcings are preserved under countable support iteration, and the fact that if $kappa$ is supercompact, then there exists a Laver function for $kappa$ .

It is not yet known how much large cardinal strength comes from PFA.

Other forcing axioms

The bounded proper forcing axiom (BPFA) is a weaker variant of PFA which instead of arbitrary dense subsets applies only to maximal antichains of size ω₁. Martin's maximum is the strongest possible version of a forcing axiom.

Forcing axioms are viable candidates for extending the axioms of set theory as an alternative to large cardinal axioms.

References

*
*

Wikimedia Foundation. 2010.

Игры ⚽ Нужно решить контрольную?

Look at other dictionaries:

Martin's axiom — In the mathematical field of set theory, Martin s axiom, introduced by Donald A. Martin and Robert M. Solovay (1970), is a statement which is independent of the usual axioms of ZFC set theory. It is implied by the continuum hypothesis, so… … Wikipedia
Forcing (mathematics) — For the use of forcing in recursion theory, see Forcing (recursion theory). In the mathematical discipline of set theory, forcing is a technique invented by Paul Cohen for proving consistency and independence results. It was first used, in 1963,… … Wikipedia
Axiom — This article is about logical propositions. For other uses, see Axiom (disambiguation). In traditional logic, an axiom or postulate is a proposition that is not proven or demonstrated but considered either to be self evident or to define and… … Wikipedia
Axiom of choice — This article is about the mathematical concept. For the band named after it, see Axiom of Choice (band). In mathematics, the axiom of choice, or AC, is an axiom of set theory stating that for every family of nonempty sets there exists a family of … Wikipedia
Martin's maximum — In set theory, Martin s maximum, introduced by Foreman, Magidor Shelah (1988), is a generalization of the proper forcing axiom, which is in turn a generalization of Martin s axiom. Martin s maximum (MM) states that if D is a collection of dense… … Wikipedia
List of first-order theories — In mathematical logic, a first order theory is given by a set of axioms in somelanguage. This entry lists some of the more common examples used in model theory and some of their properties. PreliminariesFor every natural mathematical structure… … Wikipedia
List of mathematics articles (P) — NOTOC P P = NP problem P adic analysis P adic number P adic order P compact group P group P² irreducible P Laplacian P matrix P rep P value P vector P y method Pacific Journal of Mathematics Package merge algorithm Packed storage matrix Packing… … Wikipedia
Aronszajn tree — In set theory, an Aronszajn tree is an uncountable tree with no uncountable branches and no uncountable levels. For example, every Suslin tree is an Aronszajn tree. More generally, for a cardinal kappa;, a kappa; Aronszajn tree is a tree of… … Wikipedia
Laver function — In set theory, a Laver function (or Laver diamond, named after its inventor, Richard Laver) is a function connected with supercompact cardinals. DefinitionIf kappa; is a supercompact cardinal, a Laver function is a function fnof; : kappa; rarr; V … Wikipedia
Singular cardinals hypothesis — In set theory, the singular cardinals hypothesis (SCH) arose from the question of whether the least cardinal number for which the generalized continuum hypothesis (GCH) might fail could be a singular cardinal.According to Mitchell (1992), the… … Wikipedia

Academic Dictionaries and Encyclopedias

Proper forcing axiom

Look at other dictionaries:

Share the article and excerpts

Academic Dictionaries and Encyclopedias

Wikipedia

Proper forcing axiom

Look at other dictionaries:

Share the article and excerpts

Direct link