The discussion centers around the definition of the Hamiltonian in the context of quantum mechanics and its relation to time derivatives. Participants explore the implications of defining the Hamiltonian as a first derivative with respect to time, questioning whether it could be defined as a second derivative instead, and examining the underlying principles and mathematical foundations.
Participants express a range of views on the definition of the Hamiltonian, with no consensus reached. Some support the first derivative definition while others propose alternative interpretations or express confusion about the implications of different definitions.
Participants acknowledge that the choice of units and definitions can be arbitrary, leading to different interpretations of the Hamiltonian's role in physics. There are also references to deeper mathematical symmetries that may influence the understanding of the Hamiltonian.
My question was deeper than that. If we had a s-2 from a second derivative then the units of the Planck constant would be adjusted accordingly.sk1105 said:In the unlabelled equation between 11.19 and 11.20, notice the presence of ##\hbar##. The reduced Planck constant has units ##Js##, which combine with the ##s^{-1}## from the derivative to leave just ##J##, the units of energy.
Explicitly, we have ##[\hbar]=kgm^2s^{-2} \cdot s=kgm^2s^{-1}##. Multiplying this by the ##s^{-1}## from the derivative gets us back to ##kgm^2s^{-2}##, the units of energy.
If you're ever in doubt about something like this, a bit of dimensional analysis like I've done here will usually solve your problem.
forcefield said:Why is Hamiltonian defined as 1st derivative with respect to time
Because that is consistent with the definition of the Hamiltonian in classical mechanics. Have you seen the Hamilton-Jacobi equation: H = - \frac{\partial S}{\partial t} . If you multiply both sides with the non-zero function (i / \hbar) \exp ( i S / \hbar ), you find \frac{i}{\hbar} H e^{i S / \hbar} = - \frac{\partial}{\partial t} e^{ i S / \hbar } , or ( H - i \hbar \frac{d}{dt} ) e^{ i S / \hbar} = 0 .forcefield said:Why is Hamiltonian defined as 1st derivative with respect to time ?
But there is also m^{2}, so why not x^{2} \frac{d^2}{d t^2}? The choice of units is arbitrary. I can choose to measure the energy in kg, so can you tell me how you “define” the Hamiltonian in this case?From the units of energy (kgm2s-2) I would expect it to be defined as 2nd derivative with respect to time.
samalkhaiat said:Because that is consistent with the definition of the Hamiltonian in classical mechanics. Have you seen the Hamilton-Jacobi equation: H = - \frac{\partial S}{\partial t} . If you multiply both sides with the non-zero function (i / \hbar) \exp ( i S / \hbar ), you find \frac{i}{\hbar} H e^{i S / \hbar} = - \frac{\partial}{\partial t} e^{ i S / \hbar } , or ( H - i \hbar \frac{d}{dt} ) e^{ i S / \hbar} = 0 .
samalkhaiat said:But there is also m^{2}, so why not x^{2} \frac{d^2}{d t^2}? The choice of units is arbitrary. I can choose to measure the energy in kg, so can you tell me how you “define” the Hamiltonian in this case?
bhobba said:For example, from symmetry alone, you end up with p=mv where m is some constant.
Ulf Leonhardt said:As the state vector should describe the complete physical information about the state, including its fate in coherent evolution processes, the equation must be of first order in the parameter t. Otherwise derivatives of ##|\psi>## with respect to t would be needed to completely define the initial conditions. So we are led to the differential equation: ##i\hbar\frac{d∣Ψ⟩}{dt}=\hat{H}|\psi⟩##
forcefield said:So... am I completely lost if I take that the Hamiltonian actually describes a momentum and you need to take the vector modulus and square it to get energy. I should probably get the Ballentine book.
Swamp Thing said:A lighter read about Noether's life & work:
http://www.newscientist.com/article...est-physics-theorem-youve-never-heard-of.html