Kelley-Morse set theory does not prove the class Fodor principle

Abstract

We show that Kelley-Morse set theory does not prove the class Fodor principle, the assertion that every regressive class function F:S defined on a stationary class S is constant on a stationary subclass. Indeed, it is relatively consistent with KM for any infinite λ with ω≤λ≤Ord that there is a class function F:Ordλ that is not constant on any stationary class. Strikingly, it is consistent with KM that there is a class A⊂eqω×Ord, such that each section An=\α (n,α)∈ A\ contains a class club, but n An is empty. Consequently, it is relatively consistent with KM that the class club filter is not σ-closed.