28 Feb
2019
28 Feb
'19
5:48 p.m.
hi cos-top
Do there exist any hyperbolic multiply connected constant-curvature compact spaces for which the fundamental domain is a cube (with flat faces, of course) for some points in the space? Or is there a proof that this is impossible?
We know that there are (at least) two such spherical spaces, that Peter Kramer calls C_2 and C_3:
Kramer09: https://ui.adsabs.harvard.edu/#abs/2009PhyS...80b5902K/
Are there any hyperbolic ones?
Cheers Boud
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