Convert (4D+) rotation matrix to Euler Angles [closed]

I've searched alot about converting rotation matrix to euler angles. But the problem is that I need to convert a 4D or higher rotation matrix to euler angle in specified order

This must be possible, but I've never seen code that does this.

Anybody has an idea?

(Simple solution like "use atan2" to get for example vector (0, 0, 1) correct then the rest does NOT work here. this is why I am asking this.)

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closed as off topic by Jan Dvorak, Mario, mipe34, martin clayton, Royston PintoApr 1 '13 at 20:52

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4D transformation is a 3D rotation matrix plus a 3D translation vector. Just extract the top left 3x3 elements and proceed according to geometrictools.com/Documentation/EulerAngles.pdf –  ja72 Apr 1 '13 at 18:47
have you tried this ? (rotation part of the matrix of course (first 3x3)) –  George Profenza Apr 1 '13 at 19:39

1 Answer

This is complicated by the fact that rotation still only occurs in 2 dimensions. So for 4D, you have (6) rotation matrices for: XY, YZ, ZX, XW, YW, ZW. For N-dimensions: `N(N-1)/2` rotation matrices. In effect, you would need to specify (6) Euler angles (or an equivalent) for 4D.

Without getting into SO(n) group theory, you could look at this paper, which includes some pseudo-code.

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