Periodically poled lithium niobate (
PPLN) is a domain-engineered lithium niobate crystal, used mainly for achieving
quasi-phase-matching in
nonlinear optics. The
ferroelectric domains point alternatively to the
+c and the
−c direction, with a period of typically between 5 and 35
μm. The shorter periods of this range are used for
second-harmonic generation, while the longer ones for
optical parametric oscillation.
Periodic poling can be achieved by electrical poling with periodically structured electrode. Controlled heating of the crystal can be used to fine-tune
phase matching in the medium due to a slight variation of the dispersion with temperature. Periodic poling uses the largest value of lithium niobate's nonlinear tensor,
d33 = 27 pm/V. Quasi-phase-matching gives maximum efficiencies that are 2/π (64%) of the full
d33, about 17 pm/V. Other materials used for
periodic poling are wide-
band-gap inorganic crystals like
KTP (resulting in
periodically poled KTP,
PPKTP),
lithium tantalate, and some organic materials. The periodic-poling technique can also be used to form surface
nanostructures. However, due to its low photorefractive damage threshold, PPLN only finds limited applications, namely, at very low power levels. MgO-doped lithium niobate is fabricated by periodically poled method. Periodically poled MgO-doped lithium niobate (PPMgOLN) therefore expands the application to medium power level.
Sellmeier equations The
Sellmeier equations for the extraordinary index are used to find the poling period and approximate temperature for quasi-phase-matching. Jundt gives : n^2_e \approx 5.35583 + 4.629 \times 10^{-7} f + \frac{0.100473 + 3.862 \times 10^{-8} f}{\lambda^2 - (0.20692 - 0.89 \times 10^{-8} f)^2} + \frac{100 + 2.657 \times 10^{-5} f}{\lambda^2 - 11.34927^2} - 1.5334 \times 10^{-2} \lambda^2, valid from 20 to 250 °C for wavelengths from 0.4 to 5
micrometers, whereas for longer wavelengths, : n^2_e \approx 5.39121 + 4.968 \times 10^{-7} f + \frac{0.100473 + 3.862 \times 10^{-8} f}{\lambda^2 - (0.20692 - 0.89 \times 10^{-8} f)^2} + \frac{100 + 2.657 \times 10^{-5} f}{\lambda^2 - 11.34927^2} - (1.544 \times 10^{-2} + 9.62119 \times 10^{-10} \lambda) \lambda^2, which is valid for
T = 25 to 180 °C, for wavelengths λ between 2.8 and 4.8 micrometers. In these equations
f = (
T − 24.5)(
T + 570.82), λ is in micrometers, and
T is in °C. More generally for ordinary and extraordinary index for MgO-doped : : { n^2 \approx a_1 + b_1 f + \frac{a_2 + b_2 f}{\lambda^2 - (a_3 + b_3 f)^2} + \frac{a_4 + b_4 f}{\lambda^2 - a_5^2} - a_6 \lambda^2, } with: for congruent (CLN) and stochiometric (SLN). ==References==