Twitter excerpts

[michiexile]

• 09:57 Returning to MSRI. #
• 14:18 @anderssandberg There's always "collaboration visit"... I don't know how much _money_ I can shake out, but I can get hotel + office space. #
• 14:31 @maymaym SpriteMe is cute. However, I note that the spriting breaks on Chrome. #
• 15:15 Is it really too much to ask to spell the TITLE of your paper correctly? "Hilbert Irreducibility above algberaic groups" arxiv.org:1001.3079 #
• 15:24 @sc_k @kaninchenzero And this is not even touching Math.GM where one of the latest proves the rationals to be uncountable. arXiv:1001.2874 #
• 15:39 @sc_k Just like sooooooo much of Math.GM. It's the cesspool of the arXiv, it really is. #
• 15:55 @sc_k I don't read much that isn't arXiv:Math.*. I imagine I'd be horrified by physics.gen-ph - especially if its worse than Math.GM! #
• 21:04 really likes the approach to categorical knot invariants that Scott Morrison presented @ MSRI today. Grothendieck groups FTW!! #
• 23:13 successfully replaced the battery in my iPod Video once I identified it as such and not a 4th gen. Thank you #ipodjuice for your help!! #
• 23:15 @DrMathochist G(C) = \mathbb Z*{ [c] : c object in C} / [c] = [d] iff c iso d. You can build the Jordan poly. by doing this to the cat. TL #
• 23:29 @DrMathochist It's not meant to be new. It was from the introductory talk to the MSRI course on Khovanov homology in the intro workshop. #
• 23:29 @DrMathochist I like it because I haven't yet seen a good enough exposition of where the heck Khovanov homology comes from. #

Automatically shipped by LoudTwitter