30 Aug
2014
30 Aug
'14
11:32 a.m.
Adam, I thought you referred to elements of PGL(n+1) that *preserve* S^n, which is not the same thing. --Dan On Aug 30, 2014, at 1:52 AM, Adam P. Goucher <apgoucher@gmx.com> wrote:
In fact, I wonder if the elements of the conformal group Conf(S^n) that happen to also be elements of [the projective group PLG(n+1) acting on S^n] are just the rotations. (This is certainly true for n = 2, where
Conf(S^2) = Aut(S^2) = PSL(2,C),
the holomorphic automorphism group of S^2.
The [orientation-preserving] elements of the projective group PSL(n+1) acting on S^n are precisely the elements of the conformal group Conf(S^n), as I mentioned in my previous e-mail.
The group SO(n) of rotations is considerably smaller.