On 20 Jun, 19:50, Tim Wescott <t...@seemywebsite.com> wrote:

> My choice of oddball integrals was intentional, as I want to go on to
> calculating various moments for the probability distributions of the
> surface of the hypersphere when 3D probability distributions are mapped
> onto it. *Clearly if I map a tight Gaussian distribution onto the
> hypersphere with a standard deviation that's much smaller than the
> hypersphere radius the resulting probability distribution will be easy;
> it's figuring out what happens as that probability distribution opens up
> that's making my brain cramp.

I'm a bit curious about what kind of problem leads you
out in such kinds of calculations?

Rune