A solved problem for spins: Difference between revisions

An electron is at rest in an oscillating magnetic field

${\displaystyle B=B_{0}Cos\left(\omega t\right){\hat {k}}}$

where ${\displaystyle B_{0}}$ and ${\displaystyle omega}$ are constants.

(a) Construct the Hamiltonian matrix for this system.

(b) The electron starts out (at t = 0) in the spin-up state with respect to the x-axis [that is,${\displaystyle \chi ^{0}=\chi _{+}^{(x)})}$]. Determine ${\displaystyle \chi (t)}$ at any subsequent time. Beware.' This is a time-dependent Hamiltonian, so you cannot get ${\displaystyle \chi (t)}$ in the usual way from stationary states. Fortunately, in this case you can solve the time-dependent Schr/Sdinger equation directly.

(c) Find the probability of getting ${\displaystyle -\hbar /2}$ if you measure ${\displaystyle S_{x}}$

(d) What is the minimum field ${\displaystyle (B_{0})}$ required to force a complete flip in ${\displaystyle S_{x}}$?

Solution:

${\displaystyle H=-\mu \mathbf {B} .\mathbf {S} =-\mu B_{0}Cos(\omega t)S_{z}=-{\frac {\mu B_{0}\hbar }{2}}Cos(\omega t){\begin{pmatrix}1&0\\0&-1\end{pmatrix}}}$

(b) ${\displaystyle \chi (t)={\begin{pmatrix}\alpha (t)\\\beta (t))\end{pmatrix}}}$ with ${\displaystyle \alpha (0)=\beta (0)={\frac {1}{\sqrt {2}}}}$

${\displaystyle i\hbar {\frac {\partial \chi }{\partial t}}=i\hbar {\begin{pmatrix}{\dot {\alpha }}\\{\dot {\beta }}\end{pmatrix}}=\mathbf {H} \chi =-{\frac {\mu B_{0}\hbar }{2}}Cos(\omega t){\begin{pmatrix}1&0\\0&-1\end{pmatrix}}}$