Free carrier absorption

The optical susceptibility

Using the above distribution function, the time evolution of the density matrix can be ignored, which greatly simplifies the analysis.

ρ c v i n t ( k , t ) = ∫ d ω 2 π d c v ε ( ω ) e i ( ε c , k − ε v , k − ω ) t ℏ ( ε c , k − ε v , k − ω − i γ ) ( f v , k − f c , k )

The optical polarization is

P ( t ) = t r [ ρ ( t ) d ]

With this relation and after adjusting the Fourier transformation, the optical susceptibility is χ ( ω ) = − ∑ k | d c v | 2 L 3 ( f v , k − f c , k ) ( 1 ℏ ( ε v , k − ε c , k + ω + i γ ) − 1 ℏ ( ε c , k − ε v , k + ω + i γ ) )

Absorption coefficient

The transition amplitude corresponds to the absorption of energy and the absorbed energy is proportional to the optical conductivity which is the imaginary part of the optical susceptibility after frequency is multiplied. Therefore, in order to obtain the absorption coefficient that is crucial quantity for investigation of electronic structure, we can use the optical susceptibility.

α ( ω ) = 4 π ω n b c χ ″ ( ω )

= 4 π ω n b c ∑ k | d c v | 2 ( f v , k − f c , k ) δ ( ℏ ( ε v , k − ε c , k + ω ) )

The energy of free carriers is proportional to the square of momentum (E~k2). Using the band gap energy E_g and the electron-hole distribution function, we can obtain the absorption coefficient with some mathematical calculation. The final result is α ( ω ) = α 0 d ℏ ω E 0 ( ℏ ω − E g − E 0 ( d ) E 0 ) ( d − 2 ) / 2 ∑ k Θ ( ℏ ω − E g − E 0 ( d ) ) A ( ω )

This result is important to understand the optical measurement data and the electronic properties of metals and semiconductors. It is worth noting that the absorption coefficient is negative when the material supports stimulated emission, which is the basis for the operation of lasers, particularly semiconductor laser.