@Background Pony #0588
If she’s topologically equivalent to a sphere (which she is, being topologically equivalent to a hairy ball, which is topologically equivalent to a non-hairy ball, i.e. a sphere), then no. Further study is required to determine whether she is an echinoderm, cnidarian, tardigrade, or some other type of topolgically-spherical nephrozoan bilaterian altogether.
Somewhat belatedly, the ‘hairy ball theorem’ doesn’t say you can’t brush a hairy ball (obviously). It says you can’t brush a hairy ball smooth; there’ll always be a tuft sticking up somewhere.
If she’s topologically equivalent to a sphere (which she is, being topologically equivalent to a hairy ball, which is topologically equivalent to a non-hairy ball, i.e. a sphere), then no. Further study is required to determine whether she is an echinoderm, cnidarian, tardigrade, or some other type of topolgically-spherical nephrozoan bilaterian altogether.
Edited
This makes me irrationally angry
Fair clarification.
A c∞ brushing should be.
ω, ω-1, ω-2 …
Haha, good one!
Guest appearance: Fluffle Puff
Banach Tarski Banach Tarski.
Just saying.
If you are doing that then report Twi for telling her how to do it… and Celly as that’s where she had to have learned that from.
Talking Fluffy Puff