As I am progressing with my notes, I now am dealing with the angular momentum, its algebra, eigenvectors and values etc. In the notes we generalized by considering an angular momentum $\vec J$, that can represent the orbital angular momentum, the spin or any other type. The following claim is made:
$\vec J^2$ and $J_z$ build no complete set of commuting observables, therefore an additional index is needed to distinguish the different joint eigenvectors belonging to the same pair of eigenvalues $j(j+1)\hbar$ and $m\hbar$. An eigenstate can be written as $|k,j,m'rangle$.