It's from the assumption that the time operator that transforms the vector space to another vector space is continuous. With that assumption, and Wigners Theorem, it turns out the time operator must be a linear unitary operator hence transforms Linear Observables to other linear Observables. Because of this and Stones Theorem the time operator has a generator that uniquely determines it and by definition is the energy of the system. Thus knowledge of energy operator uniquely determines the time operator so is deterministic. And it can be proven from the assumption of Galilaen invariance the Energy operator has the form standard to classical mechanics - where it is called the Hamiltonian -you will find a proof of this in Ballentine - QM A Modern Development Chapter 3. So basically determinism follows from the very reasonable assumption of continuity.
In applying it, it is assumed, again quite reasonably considering the theorem proved in Ballentine and the expectation of an operator goes over to the classical system equation, the Hamiltonian of the system you are quantising, is the same as the classical version.
Thanks
Bill