I am trying to figure out 3d rotation of point cloud around an arbitrary axis. I am really close to understand whole math behind it but not yet.

Steps are defined below according to https://sites.google.com/site/glennmurray/Home/rotation-matrices-and-formulas/rotation-about-an-arbitrary-axis-in-3-dimensions
(1) Translate space so that the rotation axis passes through the origin.
(2) Rotate space about the z axis so that the rotation axis lies in the xz plane.
(3) Rotate space about the y axis so that the rotation axis lies along the z axis.
(4) Perform the desired rotation by θ about the z axis.
(5) Apply the inverse of step (3).
(6) Apply the inverse of step (2).
(7) Apply the inverse of step (1).

Should I apply these steps for all points in the cloud by one by or should I find a center for the points in the cloud and then apply? Or would it both give same result?

If I draw a vector to centroid from the arbitrary axis and apply the steps above to find tranformation matrix, then multiply all points with that matrix, will I make it right?

The other way I thought would be drawing vectors for each points and apply the steps for each individual points. This will result each point will have different transformation matrix I guess.

I am trying to integrate them in PCL C++.

  • What does drawing the points have to do with transforming them? Just create a single transformation matrix for the entire cloud. Also, see here for how to rotate around an arbitrary center. – meowgoesthedog May 3 '18 at 18:05
  • But transformation matrix being generated includes the components of the vector. How can I generate one transformation matrix to apply them all? Or I am confusing about the 3d rotation matrix? – meakcey May 5 '18 at 16:53
  • Components of what vector? A transformation matrix can be implemented with many types of transformations, including rotations, scaling and translations, without prior knowledge of any points / vectors it will be applied to. – meowgoesthedog May 5 '18 at 17:09
  • ok, i think i have a problem about the rotation vector. how could we determine rotation vector? lets say, there is another coordinate system which is translated from the origin with the (X10,Y20,Z10) – meakcey May 5 '18 at 17:17
  • It is unclear as to what you are asking. Are you trying to determine the rotation of one particle cloud with respect to another? Least-squares optimization problem? – meowgoesthedog May 5 '18 at 17:28

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