The Franz–Keldysh effect is a change in optical absorption by a semiconductor when an electric field is applied. The effect is named after the German physicistWalter Franz and Russian physicist Leonid Keldysh. Karl W. Böer observed first the shift of the optical absorption edge with electric fields during the discovery of high-field domains and named this the Franz-effect. A few months later, when the English translation of the Keldysh paper became available, he corrected this to the Franz–Keldysh effect. As originally conceived, the Franz–Keldysh effect is the result of wavefunctions "leaking" into the band gap. When an electric field is applied, the electron and hole wavefunctions become Airy functions rather than plane waves. The Airy function includes a "tail" which extends into the classically forbidden band gap. According to Fermi's golden rule, the more overlap there is between the wavefunctions of a free electron and a hole, the stronger the optical absorption will be. The Airy tails slightly overlap even if the electron and hole are at slightly different potentials. The absorption spectrum now includes a tail at energies below the band gap and some oscillations above it. This explanation does, however, omit the effects of excitons, which may dominate optical properties near the band gap. The Franz–Keldysh effect occurs in uniform, bulk semiconductors, unlike the quantum-confined Stark effect, which requires a quantum well. Both are used for electro-absorption modulators. The Franz–Keldysh effect usually requires hundreds of volts, limiting its usefulness with conventional electronics – although this is not the case for commercially available Franz–Keldysh-effect electro-absorption modulators that use a waveguide geometry to guide the optical carrier.
Effect on modulation spectroscopy
The absorption coefficient is related to the dielectric constant. From Maxwell's equation, we can easily find out the relation, n0 and k0 are the real and complex parts of the refractive index of the material. We will consider the direct transition of an electron from the valence band to the conduction band induced by the incident light in a perfect crystal and try to take into account of the change of absorption coefficient for each Hamiltonian with a probable interaction like electron-photon, electron-hole, external field. These approach follows from. We put the 1st purpose on the theoretical background of Franz–Keldysh effect and third-derivative modulation spectroscopy.
One electron Hamiltonian in an electro-magnetic field
Neglecting the square term and using the relation within the Coulomb gauge, we obtain Then using the Bloch function the transition probability can be obtained such that Power dissipation of the electromagnetic waves per unit time and unit volume gives rise to following equation From the relation between the electric field and the vector potential,, we may put And finally we can get the imaginary part of the dielectric constant and surely the absorption coefficient.
2-body(electron-hole) Hamiltonian with EM field
An electron in the valence band is excited by photon absorption into the conduction band and leaves a hole in the valence band. In this case, we include the electron-hole interaction. Thinking about the direct transition, is almost same. But Assume the slight difference of the momentum due to the photon absorption is not ignored and the bound state- electron-hole pair is very weak and the effective mass approximation is valid for the treatment. Then we can make up the following procedure, the wave function and wave vectors of the electron and hole
And we can take a total wave vectorK such that Then, Bloch functions of the electron and hole can be constructed with the phase term If V varies slowly over the distance of the integral, the term can be treated like following. here we assume that the conduction and valence bands are parabolic with scalar masses and that at the top of the valence band, i.e.
Now, The Fourier transform of and above, the effective mass equation for the exciton may be written as then the solution of eq is given by is called the envelope function of an exciton. The ground state of the exciton is given in analogy to the hydrogen atom. then, the dielectric function is detailed calculation is in. Franz–Keldysh effect means an electron in a valence band can be allowed to be excited into a conduction band by absorbing a photon with its energy below the band gap. Now we're thinking about the effective mass equation for the relative motion of electron hole pair when the external field is applied to a crystal. But we are not to take a mutual potential of electron-hole pair into the Hamiltonian. When the Coulomb interaction is neglected, the effective mass equation is And the equation can be expressed, Using change of variables: then the solution is where For example, the solution is given by The dielectric constant can be obtained inserting this equation to the , and changing the summation with respect to λ to The integral with respect to is given by the jointdensity of states for the two-D band. where Then we put And think about the case we find, thus with the asymptotic solution for the Airy function in this limit. Finally, Therefore, the dielectric function for the incident photon energy below the band gap exist! These results indicate that absorption occurs for an incident photon.