Timeline for What are compact manifolds such that GROWTH (of spheres volumes) is well approximated by the Gaussian normal distribution?
Current License: CC BY-SA 4.0
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| S Apr 24 at 21:01 | history | bounty ended | CommunityBot | ||
| S Apr 24 at 21:01 | history | notice removed | CommunityBot | ||
| S Apr 16 at 19:52 | history | bounty started | Alexander Chervov | ||
| S Apr 16 at 19:52 | history | notice added | Alexander Chervov | Authoritative reference needed | |
| Mar 30 at 6:56 | comment | added | Alexander Chervov | @RyanBudney yes, thanks. On the other hand examples mentioned - homogenous spaces and the like - do not suffer from that issue. But in general my hope is that the question should be studied, may be I just do not know the right keyword for googling, so let us first understand where we are. | |
| Mar 29 at 22:49 | comment | added | Ryan Budney | This question leaves the "well approximated" phrase a little ill-defined. In a compact manifold you could distort pretty much any Riemann metric to get a perfect fit, over a range. | |
| Mar 29 at 18:29 | history | edited | Alexander Chervov | CC BY-SA 4.0 |
added 475 characters in body
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| Mar 29 at 18:14 | history | edited | Alexander Chervov | CC BY-SA 4.0 |
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| Mar 29 at 18:04 | history | asked | Alexander Chervov | CC BY-SA 4.0 |