Finding the Expectation value for a wave function

Question

I have a question about finding the expectation value. Here's the question:
So I have this wave function $$|?⟩=frac{sqrt{6}}{?}sum_{n=1}^∞ C_?|n⟩ $$
where the eigenvectors |n⟩ form an orthonormal basis and:
$$C_n=frac{(-1)^n}{n} $$
So what I need to do consider an operator |5⟩⟨2| - I don't know what that means first of all.
And I need to find the expectation value corresponding to this operator for a particle in the state |?⟩.
I know that in order to calculate the expectation value:
$$ <Q> =⟨?|hat Q|?⟩ $$
So my question is what does |5⟩⟨2| actually mean? And going on, what shall I do next to calculate the expectation value.
Thanks for reading.

Karim Chahine · Answer

The operator $|5ranglelangle2|$ is exactly what it looks like. If you apply it to any state $|phirangle$ you get:
begin{equation}
(|5ranglelangle2|)|phirangle=langle2|phirangle|5rangle
end{equation}
That is, it gives you the ket $|5rangle$ multiplied by the projection of the state $|phirangle$ on $|2rangle$.
In general, remember that an operator is defined by how it acts on the states of your vector space.
Can you now evaluate the expectation value?

Jon · Answer

The sequence is the following
$$
langlephi|Q|phirangle=langlephi|5ranglelangle 2|phirangle.
$$
The number 5 and 2 refer to $n=5$ and $n=2$ occupation values and so, to the states $|5rangle$ and $|2rangle$ respectively. Please, note that
$$
langle m| nrangle=delta_{mn}
$$
with $m,n=1,2,ldots$ and $delta_{mn}=1$ for $m=n$ and = otherwise. Then, using all this, one has
$$
langlephi|Q|phirangle=frac{6}{pi^2}sum_{m=1}^inftysum_{n=1}^infty C_mC_nlangle m|5ranglelangle 2|nrangle.
$$
Could you go on from here?

joigus · Answer

So first of all, your state seems to be well-defined and normalised, as, $$ leftlangle phileft|phirightrangle right.=1 $$ on account of, $$ zeta(2)=sum_{n=1}^{infty}frac{1}{n^{2}}=frac{1}{1^{2}}+frac{1}{2^{2}}+frac{1}{3^{2}}+frac{1}{4^{2}}+cdots=frac{pi^{2}}{6} $$ https://en.wikipedia.org/wiki/Basel_problem

But you have a problem: $left|5rightrangle leftlangle 2right|$ is not a self-adjoing operator, so it's not a valid observable. A self-adjoint extension of it would be: $$ frac{1}{2}left(left|5rightrangle leftlangle 2right|+left|2rightrangle leftlangle 5right|right) $$ Once you do that, it's a simple matter of "sandwiching" the operator with the state in the <bra|ket> way and using orthogonality. Other way to interpret $left|5rightrangle leftlangle 2right|$ is as a transition amplitude of going from $left|5rightrangle $ to $leftlangle 2right|$. It's the words "expected value" that do not sit well with the particular operator you've proposed. I hope that was helpful, and I didn't make any idiotic mistake, to which I seem to be prone lately.

Finding the Expectation value for a wave function

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