Date: Tue, 16 Feb 1999 07:57:17 -0500 (EST)
From: James Stasheff <jds@math.unc.edu>
Subject: Topology of spherical forms (fwd)

a question from a physicist:

.oooO   Jim Stasheff            jds@math.unc.edu
(UNC)   Math-UNC                (919)-962-9607
 \ (    Chapel Hill NC          FAX:(919)-962-2568
  \*)   27599-3250

        http://www.math.unc.edu/Faculty/jds

---------- Forwarded message ----------
Date: Tue, 16 Feb 1999 12:31:26 +0000 (GMT)
From: Jose M Figueroa-O'Farrill <j.m.figueroa@qmw.ac.uk>
To: jds@math.unc.edu
Subject: Topology of spherical forms


Hi Jim,

Maybe you can point me in the right direction:

I need to compute the integer (co)homology groups for spherical forms:

       S^{2n+1}/G

where G are some finite subgroup of SO(2n+2) acting on the sphere in
the usual way: the sphere is the unit sphere in R^{2n+2} on which G
acts naturally.  I'm restricting myself to groups G such that the
above space is regular, by the way.

Where can I look this up?

Thanks in advance, Jose