So I'm supposed to know the answer to this, I suppose, but I don't seem to :-)

"Everyone knows" that, in ${\displaystyle L[U]}$ , Gödel's constructible universe relative to an ultrafilter ${\displaystyle U}$  on some measurable cardinal ${\displaystyle \kappa }$ , there is only a single normal ultrafilter, namely ${\displaystyle U}$  itself. See for example John R. Steel's monograph here, at Theorem 1.7.

So I guess that must mean that the product measure ${\displaystyle U\times U}$ , meaning you fix some identification between ${\displaystyle \kappa \times \kappa }$  and ${\displaystyle \kappa }$  and then say a set has measure 1 if measure 1 many of its vertical sections have measure 1, must not be normal. (Unless it's somehow just equal to ${\displaystyle U}$  but I don't think it is.)

But is there some direct way to see that? Say, a continuous function ${\displaystyle f:\kappa \to \kappa }$  with ${\displaystyle \forall \alpha f(\alpha )<\alpha }$  such that the set of fixed points of ${\displaystyle f}$  is not in the ultrafilter no singleton has a preimage under ${\displaystyle f}$  that's in the ultrafilter? I haven't been able to come up with it. --Trovatore (talk) 06:01, 11 December 2024 (UTC)[reply]