lugita15 said:
The Wikipedia article on the Runge-Lenze vector mentioned that the Noether-related symmetry corresponding to the Runge-Lenz vector has to do with transformations of a four-dimensional sphere, but what does this mean in concrete physical terms?
There, Wiki is talking about the SO(4) subgroup of the full dynamical group SO(4,2).
The "four-dimensional sphere" business should be regarded as abstract. The SO(4) subgroup simply happens to coincide with the group of rotations on a 4D sphere -- by definition. Personally, I never got anything useful out of thinking about it in this way.
Wikipedia also said that the symmetry is related to the fact that for inverse-square law orbits, the hodograph (velocity diagram) is circular, meaning that the particle has equal velocity changes in equal angles, a property I'm well acquainted with having read Feynman's Lost Lecture. Are you aware of what the connection is between the mysterious (to me) symmetry group and hodographs being circular?
I haven't studied hodographs in this context.
But note that SO(4,2) is not a symmetry group, but a dynamical group. Symmetry generators commute with the Hamiltonian, but dynamical generators map amongst themselves under commutation with the Hamiltonian. Symmetry generators are a (relatively) uninteresting subgroup of a dynamical group, whereas dynamical generators map solutions into other solutions, broadly speaking.
Finally, what is the connection between the Lie algebra associated with the Runge-Lenz vector and the corresponding Lie group? [...]
I'd have to go refresh my memory on the details, but I believe that the (components of) the RL vector do indeed correspond to some of the generators in the dynamical group, just as the (components of) angular momentum correspond to generators of the ordinary rotation group SO(3). Wiki gives the Lie products between the RL components and the angular momentum components.
Wikipedia says that classically, there is no variable that is made cyclic by Runge-Lenz conservation, unlike other conservation laws, so the Noether-related symmetry requires something to do with Poisson brackets. How does this all work quantum mechanically?
A comprehensive answer to this would fill a couple of textbooks. But here's a very simplified summary:
Poisson brackets are how we represent a Lie algebra in classical Hamiltonian mechanics.
If you're not familiar with this, then definitely go get a textbook like Goldstein, or Jose & Saletan. The whole technique of how we start with a classical dynamics represented by functions on phase space and Poisson brackets, and then pass to the quantum case by representing the same Lie algebra as Hermitian operators on Hilbert space (possibly symmetrizing any higher order products of the basic generators), is extremely important for understanding advanced quantization.
BTW, the thing about cyclic coordinates only matters when you're dealing with Action-Angle variables -- see J&S. These are a special case of the Hamilton-Jacobi method
in classical mechanics wherein we canonically transform from the basic phase space variables (positions and conjugate momenta) to a set of conserved quantities and their conjugate "position" variables -- which are really initial conditions. But this is too involved to explain properly here. I can only re-urge you to go get one or both of those textbooks.