Equation expansion using Symbolic Toolbox
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Hello all,
I would like to evaluate the quaternion expression using Symbolic Toolbox. I used the following convention.
I used the following code and the subsititutions.
syms g b a I J K real
A = cos(a/2)+ sin(a/2)*I;
B = cos(b/2)+ sin(b/2)*J;
C = cos(g/2)+ sin(g/2)*K;
q_rpy(I,J,K) = C*B*A;
F = expand(q_rpy)
F = subs(F,I*J,K)
F = subs(F,J*K,I)
F = subs(F,I*K,-J)
F = subs(F,K*J,-I)
F = subs(F,I^2,-1)
F = subs(F,J^2,-1)
F = subs(F,K^2,-1)
Is there any way to achieve the correct answer as above?
2 Comments
Paul
on 8 Mar 2021
I don't think this can be done easily because the SMT assumes that multiplication commutes (among other things), which is not true for the "mutliplication" of i, j, and k. So it looks like some user-written functions would be needed. I'm curious if anyone comes up with a simple solution.
Answers (1)
James Tursa
on 9 Mar 2021
0 votes
This has been discussed on this forum before, and there is no easy solution to getting the Symbolic Toolbox to deal with non-commutative objects such as quaternions directly. There are somewhat indirect methods as discussed here:
Another approach is to store all your quaternions as 4-element vectors and call your own quaternion multiply routines.
Finally, you might also be interested in this related post which discusses simplifying quaternion expressions that assume unit quaternions:
3 Comments
John D'Errico
on 10 Mar 2021
Edited: John D'Errico
on 10 Mar 2021
The only real solution is to write your own class. And then it would seem simple.
And of course, the question is is this toolbox is mathematically correct and works:
I've not checked that. I've also not checked to see if it is compatible with the symbolic toolbox. If not, then I would just write a toolbox that was.
Ravindra
on 11 Mar 2021
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on 11 Mar 2021
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