that's what I was trying to get at talking about "changes of coordinates for trajectories". I'm being imprecise because I'm not sure how to formalise this. On the original space you cannot simply have a coordinate transformation $q\mapsto f(q)$, as you point out (I mean, not all phase space transformations correspond to this). It must be something somehow encoding the information in $\dot q\mapsto (...)$.

But then again, if you consider the equations on-shell, the momenta are directly related to the coordinates via $p=\dot q$, at least in simple cases, right? After doing a canonical transf…

that's a good point I hadn't thought of. Let me try making things a bit more precise. Consider a II order DE, $\ddot q=F(q)$. Let the corresponding Hamiltonian eq be $\dot x=J\partial_x H$, with $x=(q,p)$ and $J$ standard symplectic matrix. Let $\xi=f(x)$ be a canonical transformation, thus s.t. $(\partial f)J(\partial f)^T=J$. The transformed Hamilton eqs are $\dot\xi=J\partial_\xi K$ for some new Hamiltonian $K$.

I can still unravel the equations in the transformed coordinates and get a II order DE, $\ddot\xi=\tilde F(\xi)$, right?

so let me rephrase again. Phase space and its canonical transformations should correspond to transformations on the second-order DEs that are the equations of motions. There should be a way to reformulate the structure that transpires from canonical transformations in phase space, into transformations of the form of the original equations of motion.

Well, I've got to go now. Thanks for the discussion. I'll think about it some more and see how it goes. Working out some simple example will probably clarify it for me.