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It has been suggested that this article or section be merged with Club filter and Club set (Discuss) |
In mathematics, particularly in set theory and model theory, there are at least three notions of stationary set:
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Classical notion
If 
is a cardinal of uncountable cofinality, 
and 
intersects every club set in 
then is called a stationary set. If a set is not stationary, then it is called a thin set.
If is a stationary set and 
is a club set, then their intersection 
is also stationary. Because if 
is any club set, then 
is a club set because the intersection of two club sets is club. Thus 
is non empty. Therefore 
must be stationary.
See also: Fodor's lemma
The restriction to uncountable cofinality is in order to avoid trivialities: Suppose κ has countable cofinality. Then 
is stationary in κ if and only if 
is bounded in κ. In particular, if the cofinality of κ is 
, then any two stationary subsets of κ have stationary intersection.
This is no longer the case if the cofinality of κ is uncountable. In fact, suppose κ is regular and is stationary. Then S can be partitioned into κ many disjoint stationary sets. This result is due to Solovay. If κ is a successor cardinal, this result is due to Ulam and is easily shown by means of what is called an Ulam matrix.
Jech's notion
There is also a notion of stationary subset of [X]λ, for λ a cardinal and X a set such that 
, where [X]λ is the set of subsets of X of cardinality λ: ![[X]^\lambda=\{Y\subset X:|Y|=\lambda\}](http://wpcontent.answers.com/math/2/5/5/2552922a99a0c8b523a1653d64fc62c1.png)
. This notion is due to Thomas Jech. As before, ![S\subset[X]^\lambda](http://wpcontent.answers.com/math/0/8/f/08fe5e34f0ac6dd70a1ee8d6e2b2b0db.png)
is stationary if and only if it meets every club, where a club subset of [X]λ is a set unbounded under 
and closed under union of chains of length at most λ. These notions are in general different, although for X = ω1 and 
they coincide in the sense that ![S\subset[\omega_1]^\omega](http://wpcontent.answers.com/math/0/3/4/034a3f254b67d4f6d75c497ffe6a95bf.png)
is stationary if and only if 
is stationary in ω1.
The appropriate version of Fodor's lemma also holds for this notion.
Generalized notion
There is yet a third notion, model theoretic in nature and sometimes referred to as generalized stationarity. This notion is probably due to Magidor, Foreman and Shelah and has also been used prominently by Woodin.
Now let X be a nonempty set. A set 
is club (closed and unbounded) if and only if there is a function ![F:[X]^{<\omega}\to X](http://wpcontent.answers.com/math/6/f/3/6f3d45da6d5d8b5232d8964865cae429.png)
such that ![C=\{z:F[[z]^{<\omega}]\subset z\}](http://wpcontent.answers.com/math/a/b/2/ab20a2c32f837e7747228eef0fb80e17.png)
. Here, [y] < ω is the collection of finite subsets of y.
is stationary in 
if and only if it meets every club subset of .
To see the connection with model theory, notice that if M is a structure with universe X in a countable language and F is a Skolem function for M, then a stationary S must contain an elementary substructure of M. In fact, is stationary if and only if for any such structure M there is an elementary substructure of M that belongs to S.
References
Matthew Foreman, Stationary sets, Chang's Conjecture and partition theory, in Set Theory (The Hajnal Conference) DIMACS Ser. Discrete Math. Theoret. Comp. Sci., 58, Amer. Math. Soc. , Providence, RI. 2002 pp. 73–94 File at [1]
External links
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