I have two vectors u and v. Is there a way of finding a quaternion representing the rotation from u to v?
Don't forget to normalize q Richard is right about there not being a unique rotation, but the above should give the "shortest arc". Which is probably what you need. 


HalfWay Vector SolutionI came up with the solution that I believe Imbrondir was trying to present (albeit with a minor mistake, which was probably why sinisterchipmunk had trouble verifying it). Given that we can construct a quaternion representing a rotation around an axis like so:
And that the dot and cross product of two normalized vectors are:
Seeing as a rotation from u to v can be achieved by rotating by theta (the angle between the vectors) around the perpendicular vector, it looks as though we can directly construct a quaternion representing such a rotation from the results of the dot and cross products; however, as it stands, theta = angle / 2, which means that doing so would result in twice the desired rotation. One solution is to compute a vector halfway between u and v, and use the dot and cross product of u and the halfway vector to construct a quaternion representing a rotation of twice the angle between u and the halfway vector, which takes us all the way to v! There is a special case, where u == v and a unique halfway vector becomes impossible to calculate. This is expected, given the infinitely many "shortest arc" rotations which can take us from u to v, and we must simply rotate by 180 degrees around any vector orthogonal to u (or v) as our specialcase solution. This is done by taking the normalized cross product of u with any other vector not parallel to u. Pseudo code follows (obviously, in reality the special case would have to account for floating point inaccuracies  probably by checking the dot products against some threshold rather than an absolute value). Also note that there is no special case when u == v (the identity quaternion is produced  check and see for yourself).
The
HalfWay Quaternion SolutionThis is actually the solution presented in the accepted answer, and it seems to be marginally faster than the halfway vector solution (~20% faster by my measurements, though don't take my word for it). I'm adding it here in case others like myself are interested in an explanation. Essentially, instead of calculating a quaternion using a halfway vector, you can calculate the quaternion which results in twice the required rotation (as detailed in the other solution), and find the quaternion halfway between that and zero degrees. As I explained before, the quaternion for double the required rotation is:
And the quaternion for zero rotation is:
Calculating the halfway quaternion is simply a matter of summing the quaternions and normalizing the result, just like with vectors. However, as is also the case with vectors, the quaternions must have the same magnitude, otherwise the result will be skewed towards the quaternion with the larger magnitude. A quaternion constructed from the dot and cross product of two vectors will have the same magnitude as those products:
And then normalize the result. Pseudo code follows:



The problem as stated is not welldefined: there is not a unique rotation for a given pair of vectors. Consider the case, for example, where u = <1, 0, 0> and v = <0, 1, 0>. One rotation from u to v would be a pi / 2 rotation around the zaxis. Another rotation from u to v would be a pi rotation around the vector <1, 1, 0>. 


I'm not much good on Quaternion. However I struggled for hours on this, and could not make Polaris878 solution work. I've tried prenormalizing v1 and v2. Normalizing q. Normalizing q.xyz. Yet still I don't get it. The result still didn't give me the right result. In the end though I found a solution that did. If it helps anyone else, here's my working (python) code:
A special case must be made if v1 and v2 are paralell like v1 == v2 or v1 == v2 (with some tolerance), where I believe the solutions should be Quaternion(1, 0,0,0) (no rotation) or Quaternion(0, *v1) (180 degree rotation) 


From algorithm point of view , the fastest solution looks in pseudocode
Be sure that you need unit quaternions (usualy, it is required for interpolation). NOTE: Nonunit quaternions can be used with some operations faster than unit. 


Why not represent the vector using pure quaternions? It's better if you normalize them first perhaps. 

