Closed preordered set

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In mathematics, a closed preordered set is one whose anti-well-ordered subsets have lower bounds.

Let $\kappa$ be a cardinal. A preordered set $(P,\lesssim )$ is called $\kappa$ -closed if every subset of $P$ whose opposite is well-ordered with order-type less than $\kappa$ has a lower bound.^[1]^{: 214, Definition VII.6.12}^[2]^{: Definition 15.7}^[3]^: §2

A preordered set is ${<}\kappa$ -closed if it is $\lambda$ -closed for every $\lambda <\kappa$ . A preordered set is called closed or ${<}{\operatorname {Ord} }$ -closed if it is $\kappa$ -closed for every $\kappa$ .^[4]^{: Lemma 4.0.10}

A preordered set is inductive if every chain has an upper bound. Since every totally ordered set has a well-ordered cofinal subset, this is equivalent to saying that the preordered set is the opposite of a closed preordered set.

Properties

Inductive preordered sets satisfy Zorn's lemma and the Bourbaki–Witt theorem.

A $\kappa$ -closed forcing preserves cofinalities less than or equal to $\kappa$ , hence cardinals less than or equal to $\kappa$ .^[1]^{: 215, Corollary 2.6.15}

References

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