Timeline for How to prove the existence of the polytope in $\mathbb{R}^d$ with a given number of faces, minimizing the isoperimetric ratio?
Current License: CC BY-SA 3.0
6 events
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| Jul 4, 2015 at 0:27 | answer | added | Igor Rivin | timeline score: 3 | |
| Jul 3, 2015 at 21:25 | comment | added | student | @Anton Petrunin, I'm confused because the $f$ unit exterior normal vectors are given in Lindelof's Theorem, but in the Corollary, only the number of faces are given. Maybe I didn't understand your comment. What's the meaning of "the space of configurations of n unit vectors "? | |
| Jul 3, 2015 at 20:44 | comment | added | Anton Petrunin | It follows since the space of configurations of $n$ unit vectors is compact. | |
| Jul 3, 2015 at 20:41 | history | edited | student |
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| Jul 3, 2015 at 20:15 | history | edited | student | CC BY-SA 3.0 |
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| Jul 3, 2015 at 20:08 | history | asked | student | CC BY-SA 3.0 |