I have a problem with normalization of the Jacobian matrix.
There seems to be no clear method for doing it: in some literature, it has been normalized by using some characteristic length, which is mathematically correct, but the problem is what this characteristic length should be.
(Mostly, in robotics, the characteristic length is the distance from the base coordinates to the platform (end effector) coordinates.)
It is confusing.
My Jacobian matrix is $6 \times 6$, with the first three columns having units of $\mathrm{rad}/\mathrm{L}$ and the last three columns being dimensionless.
My question is, how can I make the entire Jacobian matrix dimensionless?
Is there a way to normalize this matrix according to some mathematical relations (theory)?