proof of Fodor’s lemma

If we let $f^{-1}:\kappa\rightarrow P(S)$ be the inverse of $f$ restricted to $S$ then Fodor’s lemma is equivalent to the claim that for any function such that $\alpha\in f(\kappa)\rightarrow\alpha>\kappa$ there is some $\alpha\in S$ such that $f^{-1}(\alpha)$ is stationary.

Then if Fodor’s lemma is false, for every $\alpha\in S$ there is some club set $C_{\alpha}$ such that $C_{\alpha}\cap f^{-1}(\alpha)=\emptyset$ . Let $C=\Delta_{\alpha<\kappa}C_{\alpha}$ . The club sets are closed under diagonal intersection, so $C$ is also club and therefore there is some $\alpha\in S\cap C$ . Then $\alpha\in C_{\beta}$ for each $\beta<\alpha$ , and so there can be no $\beta<\alpha$ such that $\alpha\in f^{-1}(\beta)$ , so $f(\alpha)\geq\alpha$ , a contradiction.

Title	proof of Fodor’s lemma
Canonical name	ProofOfFodorsLemma
Date of creation	2013-03-22 12:53:19
Last modified on	2013-03-22 12:53:19
Owner	Henry (455)
Last modified by	Henry (455)
Numerical id	4
Author	Henry (455)
Entry type	Proof
Classification	msc 03E10