The hydrogen atom: no spin-orbit coupling
In the case of the hydrogen atom (with the assumption that there is no spin-orbit coupling), the observables that commute with Hamiltonian are the orbital angular momentum, spin angular momentum, the sum of the spin angular momentum and orbital angular momentum, and the components of the above angular momenta. Thus, the good quantum numbers in this case, (which are the eigenvalues of these observables) are .[6] We have omitted , since it always is constant for an electron and carries no significance as far the labeling of states is concerned.
However, all the good quantum numbers in the above case of the hydrogen atom (with negligible spin-orbit coupling), namely can't be used simultaneously to specify a state. Here is when CSCO (Complete set of commuting observables) comes into play. Here are some general results which are of general validity :
- A certain number of good quantum numbers can be used to specify uniquely a certain quantum state only when the observables corresponding to the good quantum numbers form a CSCO.
- If the observables commute, but don't form a CSCO, then their good quantum numbers refer to a set of states. In this case they don't refer to a state uniquely.
- If the observables don't commute they can't even be used to refer to any set of states, let alone refer to any unique state.
In the case of hydrogen atom, the don't form a commuting set. But are the quantum numbers of a CSCO. So, are in this case, they form a set of good quantum numbers. Similarly, too form a set of good quantum numbers.
The hydrogen atom: spin-orbit interaction included
To take the spin-orbit interaction is taken into account, we have to add an extra term in Hamiltonian[7]
- ,
where the prefactor determines the strength of the spin-orbit coupling. Now, the new Hamiltonian with this new term does not commute with and . It only commutes with , , and , which is the total angular momentum operator. In other words, are no longer good quantum numbers, but are (in addition to the principal quantum number ).
And since, good quantum numbers are used to label the eigenstates, the relevant formulae of interest are expressed in terms of them.[dubious – discuss] For example, the expectation value of the spin-orbit interaction energy is given by[8]
where
The above expressions contain the good quantum numbers characterizing the eigenstate.