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I need to create a method to generate a unit vector in three dimensions that points in a random direction using a random number generator. The distribution of direction MUST be isotropic.
Here is how I am trying to generate a random unit vector:
v = randn(1,3);
v = v./sqrt(v*v');

But I don't know how to complete the isotropic part. Any ideas?

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possible duplicate of Uniform random (Monte-Carlo) distribution on unit sphere – finnw Mar 22 '12 at 13:09
There are also some good answers here and here – finnw Mar 22 '12 at 13:14
@finnw: The question is a duplicate, but not the answers. Maybe we could merge the questions? – Jonas Mar 24 '12 at 13:29
up vote 12 down vote accepted

You're doing it right. A random normal distribution of coordinates gives you a uniform distribution of directions.

To generate 10000 uniform points on the unit sphere, you run

v = randn(10000,3);
v = bsxfun(@rdivide,v,sqrt(sum(v.^2,2)));

axis equal

enter image description here

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wow, thanks, @Jonas! I didn't know that about normal distribution! – Aina Mar 17 '12 at 23:24
@Aina: The 2D normal distribution is rotationally symmetric. Thus, the 3D normal distribution has spherical symmetry. – Jonas Mar 17 '12 at 23:51
Impressive. Any intuitive explanation on why it happens? – Andrey Rubshtein Mar 18 '12 at 16:43
@Andrey: Why the normal distribution is rotationally symmetric, you mean? The 3D normal distribution is proportional to exp(- (x^2+y^2+z^2)). The symmetry becomes obvious if you transform to spherical coordinates, where that expression becomes exp(-(r^2)). In other words, the density is only a function of the radius, not the angle, which means the points are uniformly distributed among all angles. – Jonas Mar 24 '12 at 13:25

I don't know anything much about Matlab but it seems to me like you might try generating two random polar coordinates (theta and phi) and then converting them into Cartesian coordinates using trig.

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That won't work. You'll get a higher concentration at the poles. – Oliver Charlesworth Mar 17 '12 at 16:16
This works only as long as phi follows a cosine distribution. – Jonas Mar 17 '12 at 17:03
Yes, I realised that several hours after I made my suggestion. – deadlyvices Mar 18 '12 at 21:51

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