Homework Set 1

A researcher in spintronics is investigated two devices in order to generate spin-polarized currents. One of those devices has spins comprising the current described by the density matrix:

${\displaystyle {\hat{\rho }}_1=\frac{|\uparrow ⟩⟨\uparrow |+|\downarrow ⟩⟨\downarrow |}{2}}$,

while the spins comprising the current in the other device are described by the density matrix

${\displaystyle {\hat{\rho }}_2=|u⟩⟨u|}$ , where ${\displaystyle |u⟩=\frac{e^{i\alpha }|\uparrow ⟩+e^{i\beta }|\downarrow ⟩}{\sqrt{2}}}$.

Here ${\displaystyle |\uparrow ⟩}$ and ${\displaystyle |\downarrow ⟩}$ are the eigenstates of the Pauli spin matrix ${\displaystyle {\hat{\sigma }}_z}$:

${\displaystyle {\hat{\sigma }}_z|\uparrow ⟩=+1|\uparrow ⟩,{\hat{\sigma }}_z|\downarrow ⟩=-1|\downarrow ⟩}$.

What is the spin-polarization of these two currents? Comment on the physical meaning of the difference between the spin state transported by two currents.

HINT: Compute the x, y, and z components of the spin polarization vector using both of these density matrices following the quantum-mechanical definition of an average value ${\displaystyle P_{x,y,z}=⟨{\sigma }_{x,y,z}⟩=\mathrm{T}\mathrm{r}[\hat{\rho }{\hat{\sigma }}_{x,y,z}]}$.

The Hamiltonian of a single spin of an electron in external magnetic field ${\displaystyle \mathbf{𝐁}}$ is given by (assuming that gyromagnetic ration is unity):

${\displaystyle \hat{H}=-\frac{\hslash }{2}\mathbf{𝐁}\cdot \overrightarrow{\sigma }}$

where ${\displaystyle \overrightarrow{\sigma }=({\hat{\sigma }}_x,{\hat{\sigma }}_y,{\hat{\sigma }}_z)}$ is the vector of the Pauli matrices. Show that the equation of motion

${\displaystyle i\hslash \frac{\partial \hat{\rho }}{\partial t}=[\hat{H},\hat{\rho }]}$

for the density matrix of spin-${\displaystyle \frac{1}{2}}$ discussed in the class

${\displaystyle \hat{\rho }=\frac{1}{2}(1+\mathbf{𝐏}\cdot \overrightarrow{\sigma })}$

can be recast into the equation of motion for the spin-polarization (or Bloch) vector

${\displaystyle \frac{d\mathbf{𝐏}}{dt}=-\mathbf{𝐁}\times \mathbf{𝐏}}$

since ${\displaystyle \mathit{\rho }}$ and ${\displaystyle \mathbf{𝐏}}$ are in one-to-one correspondence.

HINT: Use the following property of the Pauli matrices:

${\displaystyle {\hat{\sigma }}_{\alpha }{\hat{\sigma }}_{\beta }-{\hat{\sigma }}_{\beta }{\hat{\sigma }}_{\alpha }=2i{ϵ}_{\alpha \beta \gamma }{\hat{\sigma }}_{\gamma }}$.

In classical Hamiltonian systems the nonequilibrium entropy

${\displaystyle S=-k_B\int \rho \ln \rho }$

is constant. In this problem we want to demonstrate that in microscopic evolution of an isolated quantum system, the entropy is also time independent, even for general time-dependent density matrix ${\displaystyle \hat{\rho }}$. That is, using the equation of motion:

${\displaystyle i\hslash \frac{\partial \hat{\rho }}{\partial t}=[\hat{H},\hat{\rho }]}$

prove that von Neumann entropy

${\displaystyle S(t)=-k_B\mathrm{T}\mathrm{r}[\hat{\rho }(t)\ln \hat{\rho }(t)]}$

is time independent for arbitrary density matrix ${\displaystyle \hat{\rho }(t)}$.

HINT: Use ${\displaystyle \mathrm{T}\mathrm{r}(\hat{A}\hat{B}\hat{C})=\mathrm{T}\mathrm{r}(\hat{C}\hat{A}\hat{B})}$ for any operators ${\displaystyle \hat{A}}$, ${\displaystyle \hat{B}}$, ${\displaystyle \hat{C}}$, as well as that an operator ${\displaystyle \hat{M}}$ commutes with any function ${\displaystyle f(\hat{M})}$:

${\displaystyle [\hat{M},f(\hat{M})]=0}$.

Consider a system composed of two spins (= subsystem A and B) which are prepared in the quantum state described by the following density matrix:

${\displaystyle \hat{\rho }=\frac{1}{8}\hat{I}+\frac{1}{2}|\mathrm{\Psi }⟩⟨\mathrm{\Psi }|}$

where ${\displaystyle \hat{I}}$ denotes the ${\displaystyle 4\times 4}$ unit matrix and

${\displaystyle |\mathrm{\Psi }⟩=\frac{1}{\sqrt{2}}(|\uparrow ⟩|\downarrow ⟩-|\downarrow ⟩|\uparrow ⟩)}$

is entangled pure state of two spins.

Suppose we measure the first spin along the axis described by the unit vector ${\displaystyle \mathbf{𝐧}}$, and the second spin along the axis described by the unit vector ${\displaystyle \mathbf{𝐦}}$, where ${\displaystyle \mathbf{𝐧}\cdot \mathbf{𝐧}=\cos \theta }$. What is the probability that both spins are "spin-up" along their respective axes?

HINT: In general, the probability to measure eigenvalue ${\displaystyle \lambda }$ of a physical quantity is ${\displaystyle p=\mathrm{T}\mathrm{r}[\hat{\rho }{\hat{P}}_{\lambda }]}$, where ${\displaystyle {\hat{P}}_{\lambda }}$ is the projector on the eigensubspace of eigenvalue ${\displaystyle \lambda }$. To find the probability of measurement on the subsystem, one should use the density matrix of that subsystem, obtained by partial trace over the states of the second subsystem. Thus, the probability in the problem is obtained from:

${\displaystyle p={\mathrm{T}\mathrm{r}}_B\left[{\hat{P}}_{\mathbf{𝐦}}{\mathrm{T}\mathrm{r}}_A[({\hat{P}}_{\mathbf{𝐧}}\otimes {\hat{I}}_B)\hat{\rho }]\right]}$