Berry phases and finite electric fields

Berry phase expression for the macroscopic polarization

Calculating the change in dipole moment per unit cell under PBC's, is a nontrivial task. In general one cannot define it as the first moment of the induced change in charge density δ(r), through

${\displaystyle \Delta \mathbf{P}= \frac{1}{\Omega_{0}} \int_{\Omega_{0}} \mathbf{r} \delta \left( \mathbf{r} \right) d^{3}r }$

without introducing a dependency on the shape of Ω₀, the chosen unit cell.^[1]

Recently King-Smith and Vanderbilt^[2], building on the work of Resta^[3], showed that the electronic contribution to the difference in polarization ΔP_e, due to a finite adiabatic change in the Hamiltonian of a system, can be identified as a geometric quantum phase or Berry phase of the valence wave functions. We will briefly summarize the essential results (for a review of geometric quantum phases in polarization theory see the papers of Resta^[4][5]).

Central to the modern theory of polarization is the proposition of Resta^[3] to write the electronic contribution to the change in polarization due to a finite adiabatic change in the Kohn-Sham Hamiltonian of the crystalline solid, as

${\displaystyle \Delta \mathbf{P}_{e}= \int^{\lambda_{2}}_{\lambda_{1}}{\partial \mathbf{P}_{e} \over \partial \lambda} d\lambda }$

with

${\displaystyle {\partial \mathbf{P}_{e} \over \partial \lambda}= {i |e| \hbar \over N \Omega_{0} m_{e}} \sum_{\mathbf{k}} \sum^{M}_{n=1} \sum^{\infty}_{m=M+1} {\langle \psi^{\left(\lambda\right)}_{n\mathbf{k}} | \mathbf{\hat{p}} | \psi^{\left(\lambda\right)}_{m\mathbf{k}}\rangle \langle \psi^{\left(\lambda\right)}_{m\mathbf{k}} | \partial V^{\left(\lambda\right)}/\partial \lambda | \psi^{\left(\lambda\right)}_{n\mathbf{k}}\rangle \over \left( \epsilon^{\left(\lambda\right)}_{n\mathbf{k}}- \epsilon^{\left(\lambda\right)}_{m\mathbf{k}} \right)^{2}}+ \mathrm{c.c.} }$

where m_e and e are the electronic mass and charge, N is the number of unit cells in the crystal, Ω₀ is the unit cell volume, M is the number of occupied bands, p is the momentum operator, and the functions ψ^(λ)_nk are the usual Bloch solutions to the crystalline Hamiltonian. Within Kohn-Sham density-functional theory, the potential V^(λ) is to be interpreted as the Kohn-Sham potential V^(λ)_KS, where λ parameterizes some change in this potential, for instance due to the displacement of an atom in the unit cell.

King-Smith and Vanderbilt^[2] have cast this expression in a form in which the conduction band states ψ^(λ)_mk no longer explicitly appear, and they show that the change in polarization along an arbitrary path, can be found from only a knowledge of the system at the end points

${\displaystyle \label{PolarizationChange2} \Delta \mathbf{P}_{e}= \mathbf{P}^{\left(\lambda_{2} \right)}_{e} - {\bf P}^{\left(\lambda_{1}\right)}_{e} }$

\noindent with

${\displaystyle \label{Polarization} \mathbf{P}^{\left(\lambda\right)}_{e}=-{if|e|\over 8\pi^{3}} \sum^{M}_{n=1} \int_{BZ} d^{3}k \langle u^{\left(\lambda\right)}_{n\mathbf{k}} |\> \nabla_{\mathbf{k}} \>| u^{\left(\lambda\right)}_{n\mathbf{k}} \rangle }$

\noindent where $f$ is the occupation number of the states in the valence bands, $u^{\left(\lambda\right)}_{n\mathbf{k}}$ is the cell-periodic part of the Bloch function $\psi^{\left(\lambda\right)}_{n\mathbf{k}}$, and the sum $n$ runs over all $M$ occupied bands.

The physics behind Eq.\ (\ref{Polarization}) becomes more transparent when this expression is written in terms of the Wannier functions of the occupied bands,

${\displaystyle \label{Wannier} \mathbf{P}^{\left(\lambda\right)}_{e}=-{f |e| \over \Omega_{0}} \sum^{M}_{n=1} \langle W^{\left(\lambda\right)}_{n} | \mathbf{r} |W^{\left(\lambda\right)}_{n} \rangle }$

\noindent where $W_{n}$ is the Wannier function corresponding to valence band $n$.

Eq.\ (\ref{Wannier}) shows the change in polarization of a solid, induced by an adiabatic change in the Hamiltonian, to be proportional to the displacement of the charge centers $\mathbf{r}_{n} = \langle W^{\left(\lambda\right)}_{n} | \mathbf{r} | W^{\left(\lambda\right)}_{n} \rangle$, of the Wannier functions corresponding to the valence bands.

It is important to realize that the polarization as given by Eq.\ (\ref{Polarization}) or (\ref{Wannier}), and consequently the change in polarization as given by Eq.\ (\ref{PolarizationChange2}) is only well-defined modulo $fe\mathbf{R}/\Omega_{0}$, where $\mathbf{R}$ is a lattice vector. This indeterminacy stems from the fact that the charge center of a Wannier function is only invariant modulo $\mathbf{R}$, with respect to the choice of phase of the Bloch functions.

In practice one is usually interested in polarization changes $|\Delta{\bf P}_{e}| \ll |fe\mathbf{R}_{1}/\Omega_{0}|$, where $\mathbf{R}_{1}$ is the shortest nonzero lattice vector. An arbitrary term $fe\mathbf{R}/\Omega_{0}$ can therefore often be removed by simple inspection of the results. In cases where $|\Delta\mathbf{P}_{e}|$ is of the same order of magnitude as $|fe{\bf R}_{1}/\Omega_{0}|$ any uncertainty can always be removed by dividing the total change in the Hamiltonian $\lambda_{1} \rightarrow \lambda_{2}$ into a number of intervals.

Self-consistent response to finite electric fields

Related Tags and Sections

LBERRY, IGPAR, NPPSTR, LPEAD, IPEAD, LCALCPOL, LCALCEPS, EFIELD_PEAD, DIPOL

References

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