Big Chemical Encyclopedia

Chemical substances, components, reactions, process design ...

Articles Figures Tables About

Kerr medium second-harmonic generation

Many of the different susceptibilities in Equations (2.165)-(2.167) correspond to important experiments in linear and nonlinear optics. x<(>> describes a possible zero-order (permanent) polarization of the medium j(1)(0 0) is the first-order static susceptibility which is related to the permittivity at zero frequency, e(0), while ft> o>) is the linear optical susceptibility related to the refractive index n" at frequency to. Turning to nonlinear effects, the Pockels susceptibility j(2)(- to, 0) and the Kerr susceptibility X(3 —to to, 0,0) describe the change of the refractive index induced by an externally applied static field. The susceptibility j(2)(—2to to, to) describes frequency doubling usually called second harmonic generation (SHG) and j(3)(-2 to, to, 0) describes the influence of an external field on the SHG process which is of great importance for the characterization of second-order NLO properties in solution in electric field second harmonic generation (EFISHG). [Pg.239]

As an infrared YAG laser beam of wavelength 1.06 p,m impacts a nonlinear optical (NLO) medium, a green light of A = 0.53 pm is observed. This is the second harmonic generation (SHG) effect. The medium is the NLO sample. In addition to the second harmonic generation, the NLO effects include the Pockel effect, the Kerr effect, the third harmonic generation and the four-wave mixing. [Pg.329]

The first contribution to the polarization induces a modification of the wave propagation in the material, for both its amplitude and phase, but without any frequency change. This phenomenon is known as the optical Kerr effect, by analogy with the magneto-optic and electro-optic Kerr effects where the medium refractive index varies proportionally with the square of the applied magnetic or electric static field. The second contribution corresponds to the third harmonics generation (THG). [Pg.472]

Besides the phase of the fundamental mode, strictly speaking, the preferred phase, many other characteristics have been studied in [226]. Because a large mismatch was chosen, they have lacked any trend, but an interesting oscillatory behavior has been discovered for the initial two-mode coherent state. Within each period, the phase-matched second-harmonic and second-subharmonic generation processes can be prepared. The model of an ideal Kerr-like medium [223] have been considered for a comparison with cascaded quadratic non-linearities. It follows that these nonlinearities exhibit not only self-phase modulation in the fundamental mode but also a cross-phase modulation of the modes that can be considered for a nondemolition measurement. [Pg.577]


See other pages where Kerr medium second-harmonic generation is mentioned: [Pg.14]    [Pg.576]    [Pg.576]    [Pg.79]    [Pg.564]    [Pg.179]    [Pg.220]    [Pg.65]   
See also in sourсe #XX -- [ Pg.577 ]




SEARCH



Harmonic generator

Harmonic second

Kerr medium

Second harmonic generation

Second-harmonic generators

© 2024 chempedia.info