Electron-phonon interactions theory

Electron-phonon interactions from statistical sampling

The probability distribution of finding an atom within the coordinates ${\displaystyle \kappa+d\kappa}$ (where ${\displaystyle \kappa}$ denotes the Cartesian coordinates as well as the atom number) at temperature ${\displaystyle T}$ in the harmonic approximation is given by the following expression^[1][2]

${\displaystyle dW_{\nu}(\kappa,T)=\frac{1}{2\pi \langle u^{2}_{\nu \kappa}\rangle} e^{-\kappa^{2}/(2 \langle u^{2}_{\nu \kappa}\rangle)} d\kappa, }$

where the mean-square displacement of the harmonic oscillator is given as

${\displaystyle \langle u^{2}_{\nu \kappa}\rangle = \frac{\hbar}{2 M_{\kappa} \omega_{\nu}} \coth{\frac{\hbar \omega_{\nu}}{2 k_{B}T}}. }$

Here ${\displaystyle M_{\kappa}}$, ${\displaystyle \nu}$ and ${\displaystyle \omega_{\nu}}$ denote the mass, phonon eigenmode and phonon eigenfrequency, respectively. The equation for ${\displaystyle dW}$ is valid at any temperature and the high (Maxwell--Boltzmann distribution) and low temperature limits are easily regained. In order to obtain an observable ${\displaystyle O(T)}$ at a given temperature ${\displaystyle T</math, the average of the observable sampled at different coordinate sets <math>x_{T}^{\textrm{MC},i}}$ with sample size ${\displaystyle n}$ is taken

${\displaystyle \langle O(T)\rangle = \frac{1}{n} \sum\limits_{i=1}^{n} O(x_{T}^{\textrm{MC,i}}). }$

Each set ${\displaystyle i}$ is obtained from the equilibrium atomic positions ${\displaystyle x_{\textrm{eq}}}$ as

${\displaystyle x_{T}^{\textrm{MC,i}} = x_{\textrm{eq}} + \Delta \tau^{\textrm{MC,i}} }$

with the displacement

${\displaystyle \Delta \tau^{\textrm{MC,i}} = \sqrt{\frac{1}{M_{\kappa}}} \sum\limits_{\nu}^{3(N-1)} \varepsilon_{\kappa,\nu} \mathcal{N}. }$

Here ${\displaystyle \varepsilon_{\kappa,\nu}}$ denotes the unit vector of eigenmode ${\displaystyle \nu}$ on atom ${\displaystyle \kappa}$. The magnitude of the displacement in each Cartesian direction is obtained from the normal-distributed random variable ${\displaystyle \mathcal{N}}$ with a probability distribution according to ${\displaystyle dW}$.