Degeneracy

Two or more linear independent quantum states (Eigenstate) share the same eigenvalue. An energy level $E_n$ is degenerate if there exist multiple linearly independent Eigenstate $\left\lvert \psi_1 \right\rangle, \left\lvert \psi_2 \right\rangle, \ldots, \left\lvert \psi_n \right\rangle$ which satisfy

\hat{H}\left\lvert \psi_i \right\rangle=E_n\left\lvert \psi_i \right\rangle\quad \forall i=1,2,\ldots,g

Where if $g=1$ , the energy level is non-degenerate. If $g>1$ , the energy level is degenerate. If something is degenerate, that implies there is no unique basis. What you want to write down should be a projection onto the Subspace.

\hat{H}\triangleq\begin{pmatrix} E_0 & & 0 \\ & E_1 & \\ 0 & & E_2 \end{pmatrix} \quad \left\lvert 0 \right\rangle\triangleq\begin{pmatrix}1 \\ 0 \\ 0\end{pmatrix} \quad \left\lvert 1a \right\rangle\triangleq\begin{pmatrix}0 \\ 1 \\ 0\end{pmatrix} \quad \left\lvert 1b \right\rangle\triangleq\begin{pmatrix}0 \\ 0 \\ 1\end{pmatrix}

\Rightarrow\hat{H}=E_0\left\lvert 0 \right\rangle\left\langle 0 \right\rvert+E_1\left\lvert 1a \right\rangle\left\langle 1a \right\rvert+E_2\left\lvert 1b \right\rangle\left\langle 1b \right\rvert

The Ket (State) $\left\lvert 1a \right\rangle,\left\lvert 1b \right\rangle$ are degenerate if and only if $E_1=E_2$ . If $E_0=E_1, E_1\neq E_2$ then $\left\lvert 0 \right\rangle$ is degenerate with $\left\lvert 1a \right\rangle$ .

This just means that you can’t detect the difference between states given only the energy/eigenvalue.

Remember the eigenvalue is observed as energy if the operator is the Hamiltonian.

This means the Hamiltonian alone is not enough to determine the state.

This is because if E is degenerate then

H\left\lvert \psi_1 \right\rangle= E\left\lvert \psi_1 \right\rangle

H\left\lvert \psi_2 \right\rangle= E\left\lvert \psi_2 \right\rangle

Now just finding $E$ doesn’t mean we can distinguish the states.

We need another operator $\hat{A}$ which commutes with $\hat{H}$ to distinguish the states. Note that just because $\hat{A}$ commutes with $\hat{H}$ doesn’t mean we can distinguish the states.

A\left\lvert \psi_1 \right\rangle= a_1\left\lvert \psi_1 \right\rangle

A\left\lvert \psi_2 \right\rangle= a_2\left\lvert \psi_2 \right\rangle

And if $a_1\neq a_2$ then we can distinguish the states.

BUT if $[\hat{A},\hat{H}]\neq0$ then this doesn’t always hold true for the entire Hilbert Space.

This is because if

\hat{H}\left\lvert \psi \right\rangle= E\left\lvert \psi \right\rangle

\Rightarrow\hat{A}\hat{H}\left\lvert \psi \right\rangle= \hat{A}E\left\lvert \psi \right\rangle

\Rightarrow(\hat{H}\hat{A}-[\hat{H},\hat{A}])\left\lvert \psi \right\rangle = E\hat{A}\left\lvert \psi \right\rangle

\Rightarrow\hat{H}\hat{A}\left\lvert \psi \right\rangle - [\hat{H},\hat{A}]\left\lvert \psi \right\rangle= E\hat{A}\left\lvert \psi \right\rangle

If $[\hat{H},\hat{A}]=0$ (i.e., H and A commute) then

\Rightarrow\hat{H}\hat{A}\left\lvert \psi \right\rangle = E\hat{A}\left\lvert \psi \right\rangle

This means that $\hat{A}\left\lvert \psi \right\rangle$ is in the $E$ -eigenspace of $\hat{H}$ . Another way to say this is that $\hat{A}\left\lvert \psi \right\rangle$ is in the Set of eigenvectors for H that share eigenvalue E.

This means that $\hat{A}$ maps a vector in the $E$ -eigenspace of $\hat{H}$ to another vector in the $E$ -eigenspace of $\hat{H}$ .