set theory Set theory is the branch of mathematical logic that studies sets, which can be informally described as collections of objects. Although objects of any kind can be collected into a set, set theory, as a branch of mathematics, is mostly concer ...

, Ω-logic is an infinitary logic and

deductive system A formal system is an abstract structure used for inferring theorems from axioms according to a set of rules. These rules, which are used for carrying out the inference of theorems from axioms, are the logical calculus of the formal system. A fo ...

proposed by as part of an attempt to generalize the theory of

determinacy Determinacy is a subfield of set theory, a branch of mathematics, that examines the conditions under which one or the other player of a game has a winning strategy, and the consequences of the existence of such strategies. Alternatively and simi ...

of pointclasses to cover the structure

H_

. Just as the

axiom of projective determinacy In mathematical logic, projective determinacy is the special case of the axiom of determinacy applying only to projective sets. The axiom of projective determinacy, abbreviated PD, states that for any two-player infinite game of perfect information ...

yields a canonical theory of

H_

, he sought to find axioms that would give a canonical theory for the larger structure. The theory he developed involves a controversial argument that the

continuum hypothesis In mathematics, the continuum hypothesis (abbreviated CH) is a hypothesis about the possible sizes of infinite sets. It states that or equivalently, that In Zermelo–Fraenkel set theory with the axiom of choice (ZFC), this is equivalent ...

is false.

Analysis

Woodin's Ω-conjecture asserts that if there is a proper class of

Woodin cardinal In set theory, a Woodin cardinal (named for W. Hugh Woodin) is a cardinal number \lambda such that for all functions :f : \lambda \to \lambda there exists a cardinal \kappa < \lambda with :

\ \subseteq \kappa

and an

s (for technical reasons, most results in the theory are most easily stated under this assumption), then Ω-logic satisfies an analogue of the

completeness theorem Complete may refer to: Logic * Completeness (logic) * Completeness of a theory, the property of a theory that every formula in the theory's language or its negation is provable Mathematics * The completeness of the real numbers, which implies t ...

. From this conjecture, it can be shown that, if there is any single axiom which is comprehensive over

H_

(in Ω-logic), it must imply that the continuum is not

\aleph_1

. Woodin also isolated a specific axiom, a variation of

Martin's maximum In set theory, a branch of mathematical logic, Martin's maximum, introduced by and named after Donald Martin, is a generalization of the proper forcing axiom, itself a generalization of Martin's axiom. It represents the broadest class of for ...

, which states that any Ω-consistent

\Pi_2

(over

H_

) sentence is true; this axiom implies that the continuum is

\aleph_2

. Woodin also related his Ω-conjecture to a proposed abstract definition of large cardinals: he took a "large cardinal property" to be a

\Sigma_2

property

P(\alpha)

of ordinals which implies that α is a strong inaccessible, and which is invariant under forcing by sets of cardinal less than α. Then the Ω-conjecture implies that if there are arbitrarily large models containing a large cardinal, this fact will be provable in Ω-logic. The theory involves a definition of Ω-validity: a statement is an Ω-valid consequence of a set theory ''T'' if it holds in every model of ''T'' having the form

V^\mathbb_\alpha

for some ordinal

\alpha

and some forcing notion

\mathbb

. This notion is clearly preserved under forcing, and in the presence of a proper class of Woodin cardinals it will also be invariant under forcing (in other words, Ω-satisfiability is preserved under forcing as well). There is also a notion of Ω-provability; here the "proofs" consist of

universally Baire set In the mathematical field of descriptive set theory, a set of real numbers (or more generally a subset of the Baire space or Cantor space) is called universally Baire if it has a certain strong regularity property. Universally Baire sets play an imp ...

s and are checked by verifying that for every countable transitive model of the theory, and every forcing notion in the model, the generic extension of the model (as calculated in ''V'') contains the "proof", restricted its own reals. For a proof-set ''A'' the condition to be checked here is called "''A''-closed". A complexity measure can be given on the proofs by their ranks in the Wadge hierarchy. Woodin showed that this notion of "provability" implies Ω-validity for sentences which are

\Pi_2

over ''V''. The Ω-conjecture states that the converse of this result also holds. In all currently known

core model In set theory, the core model is a definable inner model of the universe of all sets. Even though set theorists refer to "the core model", it is not a uniquely identified mathematical object. Rather, it is a class of inner models that under the rig ...

s, it is known to be true; moreover the consistency strength of the large cardinals corresponds to the least proof-rank required to "prove" the existence of the cardinals.

Notes

References

* * * * * *

External links

*W. H. Woodin
Slides for 3 talks
{{DEFAULTSORT:Omega Logic Set theory Systems of formal logic