Physics Asked on September 27, 2021
I know that there is more than one way to go about quantization, but operationally, I find it useful to have a go-to set of steps that can convert a classical system to its quantum analog. Is there any step in this four-step recipe that isn’t valid?
Suppose your classical hamiltonian is $H(x,p) = x^2 p^2$. What quantum hamiltonian operator will your recipe produce? You might say it's $hat{H} = hat{x}^2 hat{p}^2$. However classically $x$ and $p$ are just real-valued functions on phase space, so they commute and we could just as well write $H(x, p) = p^2 x^2$, $H(x,p) = xpxp$, etc. and make the same naive replacement. Since the quantum operators don't commute, we end with different quantum hamiltonians depending on the ordering we choose.
Another problem is that the classical hamiltonian might be $H=0$. This is the case in, for example, pure Chern-Simons theory in 2+1d (with no Maxwell term or matter fields). In spite of this, the theory can be quantized canonically, leading to interesting kinematic structure. But it is not clear how one could quantize such a theory following your recipe.
Answered by d_b on September 27, 2021
No. There remains an ambiguity of ordering. See for instance this post for an example where there could be different outcomes of quantization depending on the ordering, and where your 4-step approach would be ambiguous.
Also relevant is this post.
Answered by ZeroTheHero on September 27, 2021
Very generally speaking, classical mechanics is a limiting case of quantum mechanics.
A quantization recipe gives you an informed guess as to how to get a valid quantum system whose large scale behavior is in accord with the classical system.
It might be the correct system, but like always when taking limits, there are many inequivalent systems having the same limit, however many additional (classical) constraints you add to the system.
As void said, you get a heuristic, but you will need something additional to support the physical validity.
Answered by doetoe on September 27, 2021
Get help from others!
Recent Answers
Recent Questions
© 2024 TransWikia.com. All rights reserved. Sites we Love: PCI Database, UKBizDB, Menu Kuliner, Sharing RPP