Posts Tagged ‘CH’

## Unprovability, nonvalidity, infallability

April 5, 2012
Leave a comment

Am reading Zermelo’s 1908 paper “*A new proof of the possibility of a well ordering*“. You know the one I mean … and so there, in black on white (or similar shades) he writes:

Now even in mathematics unprovability, as is well known, is in no way equivalent to nonvalidity, since, after all not everything can be proved.

he also writes:

there are no infallible authorities in mathematics

Ok, if that’s not enough, what is?

Politicians, take note …

Cheers … The best is yet to come …

Advertisements

Categories: Uncategorized
CH, Set Theory, Unprovability, Zermelo