Homework Set 3: Difference between revisions

Using the following convention

${\displaystyle |11111000\dots ⟩={\hat{c}}_5^{†}{\hat{c}}_4^{†}{\hat{c}}_3^{†}{\hat{c}}_2^{†}{\hat{c}}_1^{†}|\mathrm{v}\mathrm{a}\mathrm{c}\mathrm{u}\mathrm{u}\mathrm{m}⟩}$

where ${\displaystyle |\mathrm{v}\mathrm{a}\mathrm{c}\mathrm{u}\mathrm{u}\mathrm{m}>=|0000\dots ⟩}$:

(a) Evaluate ${\displaystyle {\hat{c}}_3^{†}{\hat{c}}_6{\hat{c}}_4{\hat{c}}_6^{†}{\hat{c}}_3|\mathrm{v}\mathrm{a}\mathrm{c}\mathrm{u}\mathrm{u}\mathrm{m}⟩}$

The pair correlation function gives the relative probability of finding a particle at position ${\displaystyle {\mathbf{𝐫}}^{\prime }}$ if we know that there is one at position ${\displaystyle \mathbf{𝐫}}$. It is defined by:

${\displaystyle G(\mathbf{𝐫}-{\mathbf{𝐫}}^{\prime })=⟨\mathrm{\Phi }(\mathbf{𝐫})|{\hat{\mathrm{\Psi }}}^{†}({\mathbf{𝐫}}^{\prime })\hat{\mathrm{\Psi }}({\mathbf{𝐫}}^{\prime })|\mathrm{\Phi }(\mathbf{𝐫})⟩=⟨{\mathrm{\Phi }}_0|{\hat{\mathrm{\Psi }}}^{†}(\mathbf{𝐫}){\hat{\mathrm{\Psi }}}^{†}({\mathbf{𝐫}}^{\prime })\hat{\mathrm{\Psi }}({\mathbf{𝐫}}^{\prime })\hat{\mathrm{\Psi }}(\mathbf{𝐫})|{\mathrm{\Phi }}_0⟩}$

Here ${\displaystyle |\mathrm{\Phi }(\mathbf{𝐫})⟩=\hat{\mathrm{\Psi }}(\mathbf{𝐫})|{\mathrm{\Phi }}_0⟩}$ is a state with ${\displaystyle N-1}$ particles, obtained after removal of one particle at position ${\displaystyle \mathbf{𝐫}}$, so that pair correlation function is computed as the expectation value of the density operator in this new quantum state. Compute the pair correlation function for a system of translationally invariant noninteracting spinless bosons in many-body state

${\displaystyle |{\mathrm{\Phi }}_0⟩=|n_{{\mathbf{𝐤}}_0},n_{{\mathbf{𝐤}}_1},\dots ⟩}$

by transforming field operators to creation and annihilation operators in momentum representation while assuming that bosons are enclosed in a box of volume ${\displaystyle V}$ with periodic boundary conditions. Your final result should be a function of ${\displaystyle \mathbf{𝐫},{\mathbf{𝐫}}^{\prime }}$ and sums over ${\displaystyle n_{\mathbf{𝐤}}}$, where you can also use that

${\displaystyle ⟨{\mathrm{\Phi }}_0|{\hat{\mathrm{\Psi }}}^{†}(\mathbf{𝐫})\hat{\mathrm{\Psi }}(\mathbf{𝐫})|{\mathrm{\Phi }}_0⟩=\frac{1}{V}\sum _{\mathbf{𝐤}}{n}_{\mathbf{𝐤}}=N}$.

==Problem 3: