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Skeletal animation is a well-known techniques in 3D Computer Graphics. I am interested in transformation blending algorithm when a final transformation is calculated from several join transformations. I read about different techniques and I have tried dual quaternion and linear matrix methods. I understand that first gives good results and the second has problems. However, I don't understand why it cannot be split a transformation into translation and rotation and make their interpolations separately. For example, I can present the rotation as Euler angles (with some restrictions) and the translation as vector and make a linear interpolation. What are the problems with this method of interpolation? Why do all people (in papers, posts, ...) suggest to use complex and performance consuming methods?

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Read Kavan's original papers about dual quaternion skinning, he explains pretty well why interpolating translation and rotation seperately gives problems. And besides that, never ever, again never ever use Euler angles for interpolation between different rotations. In fact Euler angles have only very few use cases where they really make sense, but interpolation is the anti-use-case. –  Christian Rau Mar 5 '12 at 18:06
And as to performance, dual quaternion skinning isn't really slower than interpolating and applying translation and rotation (as a quaternion) seperately (when done correctly, you don't do a quaternion-to-matrix-conversion inside a shader, of course), and it isn't much more complex either, once you understood screw transformations and built the basic conversion routines. –  Christian Rau Mar 5 '12 at 18:09
Thx. Can u, please, make an answer and support "the anti-use-case" by some links with explanation? –  itun Mar 5 '12 at 18:11
Besides all that, the question doesn't fit well on StackOverflow, due to its broadness and generality. Maybe the guys at are more of help to you. –  Christian Rau Mar 5 '12 at 18:12

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