Given a unit vector **n**, I need to generate, *as fast as possible*, another random unit vector **m**. The deviation of **m** from **n** should be on the order of a positive parameter `sigma`

, and the distribution of **m** on the unit sphere should be symmetrical around **n**.

I have no specific requirements on the representation of unit vectors, so you can use spherical angles, Cartesian coordinates, or whatever turns out to be convenient. Also, there are no precise requirements on the probability distributions used, as long as it decays when **m** deviates more than `sigma`

from **n**.

I am working with `gsl`

and `C`

. I have come up with a somewhat convoluted method using Cartesian coordinates. I will post it later if it is useful, but I would like to see people's ideas.

`The deviation of m from n should be on the order of a positive parameter sigma`

mean`The angle between m and n should be normally distributed with mean 0 and standard deviation sigma`

? – japreiss Sep 10 '12 at 21:40mandninstead of the angle. That's why I wasn't precise. – becko Sep 11 '12 at 11:03