Did you skip over the octahedron and jump to the icosahedron? Or was that a typo? Jim On Mon, Aug 12, 2019 at 11:27 AM Tomas Rokicki <rokicki@gmail.com> wrote:
Easy change. This is for a unit-edge icosahedron.
At 268435456 pts 5.10427626222372 area 0.401024503683306 perim 2.31454808198346
On Mon, Aug 12, 2019 at 7:58 AM Veit Elser <ve10@cornell.edu> wrote:
I haven’t had time to follow this, but I’d think one could take advantage of the fact that there is a periodic tiling of space by the octahedron and tetrahedron.
-Veit
On Aug 12, 2019, at 3:31 AM, James Propp <jamespropp@gmail.com> wrote:
Lionel Levine suggests trying the octahedron in hope of finding some interesting duality phenomenon (maybe random planes cutting an octahedron have something to do with random lines cutting a cube while random lines cutting an octahedron have something to do with random planes cutting a cube).
Can someone try this too?
Thanks,
Jim Propp
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