Luttinger parameter

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In semiconductors, valence bands are well characterized by 3 Luttinger parameters. At the Г-point in the band structure, ${\displaystyle p_{3/2}}$ and ${\displaystyle p_{1/2}}$ orbitals form valence bands. But spin–orbit coupling splits sixfold degeneracy into high energy 4-fold and lower energy 2-fold bands. Again 4-fold degeneracy is lifted into heavy- and light hole bands by phenomenological Hamiltonian by J. M. Luttinger.

In the presence of spin–orbit interaction, total angular momentum should take part in. From the three valence band, l=1 and s=1/2 state generate six state of ${\displaystyle |j,m_j⟩}$ as ${\displaystyle |\frac{3}{2},\pm \frac{3}{2}⟩,|\frac{3}{2},\pm \frac{1}{2}⟩,|\frac{1}{2},\pm \frac{1}{2}⟩}$

The spin–orbit interaction from the relativistic quantum mechanics, lowers the energy of ${\displaystyle j=\frac{1}{2}}$ states down.

Phenomenological Hamiltonian in spherical approximation is written as^[1]

${\displaystyle H=\frac{{\hslash }^2}{2m_0}[({\gamma }_1+\frac{5}{2}{\gamma }_2){𝐤}^2-2{\gamma }_2(𝐤\cdot 𝐉{)}^2]}$

Phenomenological Luttinger parameters ${\displaystyle {\gamma }_i}$ are defined as

${\displaystyle \alpha ={\gamma }_1+\frac{5}{2}{\gamma }_2}$

and

${\displaystyle \beta ={\gamma }_2}$

If we take ${\displaystyle 𝐤}$ as ${\displaystyle 𝐤=k{\hat{e}}_z}$, the Hamiltonian is diagonalized for ${\displaystyle j=3/2}$ states.

${\displaystyle E=\frac{{\hslash }^2{k}^2}{2m_0}({\gamma }_1+\frac{5}{2}{\gamma }_2-2{\gamma }_2{m}_j^2)}$

Two degenerated resulting eigenenergies are

${\displaystyle E_{hh}=\frac{{\hslash }^2{k}^2}{2m_0}({\gamma }_1-2{\gamma }_2)}$ for ${\displaystyle m_j=\pm \frac{3}{2}}$

${\displaystyle E_{lh}=\frac{{\hslash }^2{k}^2}{2m_0}({\gamma }_1+2{\gamma }_2)}$ for ${\displaystyle m_j=\pm \frac{1}{2}}$

${\displaystyle E_{hh}}$ (${\displaystyle E_{lh}}$) indicates heav-(light-) hole band energy. If we regard the electrons as nearly free electrons, the Luttinger parameters describe effective mass of electron in each bands.

In gallium arsenide,

${\displaystyle {ϵ}_{h,l}=-\frac{1}{2}{\gamma }_1{k}^2\pm [{{\gamma }_2}^2{k}^4+3({{\gamma }_3}^2-{{\gamma }_2}^2)\times ({k_x}^2{k_z}^2+{k_x}^2{k_y}^2+{k_y}^2{k_z}^2){]}^{1/2}}$

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