Uniform grid of points on SO(3)
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I would like to place $N$ equally spaced points on $SO(3)$ (or approximately equally spaced points). Here, every "point" refers to a rotation, and $N$ is user-specified. I came across the Fibonacci sphere algorithm from this post, which distributes points evenly on the sphere $S^2$ . I am wondering if that idea can be extended to $SO(3)$ .
differential-geometry lie-groups computational-geometry
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edited Nov 30 '18 at 3:13
husB
asked Nov 30 '18 at 3:07
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