Nonlinear optics (NLO) is the branch of optics that describes the behavior of light in nonlinear media, that is, media in which the dielectric polarization P responds nonlinearly to the electric field E of the light. This nonlinearity is typically only observed at very high light intensities (values of the electric field comparable to interatomic electric fields, typically 10^{8} V/m) such as those provided by lasers. Above the Schwinger limit, the vacuum itself is expected to become nonlinear. In nonlinear optics, the superposition principle no longer holds.
Nonlinear optics remained unexplored until the discovery of Second harmonic generation shortly after demonstration of the first laser. (Peter Franken et al. at University of Michigan in 1961)
Contents

Nonlinear optical processes 1

Frequency mixing processes 1.1

Other nonlinear processes 1.2

Related processes 1.3

Parametric processes 2

Theory 2.1

Waveequation in a nonlinear material 2.1.1

Nonlinearities as a wave mixing process 2.1.2

Phase matching 2.2

Higherorder frequency mixing 3

Example uses of nonlinear optics 4

Frequency doubling 4.1

Optical phase conjugation 4.2

Common SHG materials 5

See also 6

Notes 7

References 8

External links 9
Nonlinear optical processes
Nonlinear optics gives rise to a host of optical phenomena:
Frequency mixing processes

Second harmonic generation (SHG), or frequency doubling, generation of light with a doubled frequency (half the wavelength), two photons are destroyed creating a single photon at two times the frequency.

Third harmonic generation (THG), generation of light with a tripled frequency (onethird the wavelength), three photons are destroyed creating a single photon at three times the frequency.

High harmonic generation (HHG), generation of light with frequencies much greater than the original (typically 100 to 1000 times greater)

Sum frequency generation (SFG), generation of light with a frequency that is the sum of two other frequencies (SHG is a special case of this)

Difference frequency generation (DFG), generation of light with a frequency that is the difference between two other frequencies

Optical parametric amplification (OPA), amplification of a signal input in the presence of a higherfrequency pump wave, at the same time generating an idler wave (can be considered as DFG)

Optical parametric oscillation (OPO), generation of a signal and idler wave using a parametric amplifier in a resonator (with no signal input)

Optical parametric generation (OPG), like parametric oscillation but without a resonator, using a very high gain instead

Spontaneous parametric down conversion (SPDC), the amplification of the vacuum fluctuations in the low gain regime

Optical rectification (OR), generation of quasistatic electric fields.

Nonlinear lightmatter interaction with free electrons and plasmas^{[1]}^{[2]}^{[3]}^{[4]}
Other nonlinear processes
Related processes
In these processes, the medium has a linear response to the light, but the properties of the medium are affected by other causes:
Parametric processes
Nonlinear effects fall into two qualitatively different categories, parametric and nonparametric effects. A parametric nonlinearity is an interaction in which the quantum state of the nonlinear material is not changed by the interaction with the optical field. As a consequence of this, the process is 'instantaneous'; Energy and momentum conserving in the optical field, making phase matching important; and polarization dependent.^{[5]} ^{[6]}
Theory
Parametric and lossy 'instantaneous' (i.e. electronic) nonlinear optical phenomena, in which the optical fields are not too large, can be described by a Taylor series expansion of the dielectric Polarization density (dipole moment per unit volume) P(t) at time t in terms of the electrical field E(t):

\mathbf{P}(t) = \varepsilon_0( \chi^{(1)} \mathbf{E}(t) + \chi^{(2)} \mathbf{E}^2(t) + \chi^{(3)} \mathbf{E}^3(t) + \ldots )\ .
Here, the coefficients χ^{(n)} are the nth order susceptibilities of the medium and the presence of such a term is generally referred to as an nth order nonlinearity. In general χ^{(n)} is an n+1 order tensor representing both the polarization dependent nature of the parametric interaction as well as the symmetries (or lack thereof) of the nonlinear material.
Waveequation in a nonlinear material
Central to the study of electromagnetic waves is the wave equation. Starting with Maxwell's equations in an isotropic space containing no free charge, it can be shown that:

\nabla \times \nabla \times \mathbf{E} + \frac{n^2}{c^2}\frac{\partial^2}{\partial t^2}\mathbf{E} = \frac{1}{\varepsilon_0 c^2}\frac{\partial^2}{\partial t^2}\mathbf{P}^{NL},
where P^{NL} is the nonlinear part of the Polarization density and n is the refractive index which comes from the linear term in P.
Note one can normally use the vector identity

\nabla \times \left( \nabla \times \mathbf{V} \right) = \nabla \left( \nabla \cdot \mathbf{V} \right)  \nabla^2 \mathbf{V}
and Gauss's law,

\nabla\cdot\mathbf{D} = 0,
to obtain the more familiar wave equation

\nabla^2 \mathbf{E}  \frac{n^2}{c^2}\frac{\partial^2}{\partial t^2}\mathbf{E} = 0.
For nonlinear medium Gauss's law does not imply that the identity

\nabla\cdot\mathbf{E} = 0
is true in general, even for an isotropic medium. However even when this term is not identically 0, it is often negligibly small and thus in practice is usually ignored giving us the standard nonlinear waveequation:

\nabla^2 \mathbf{E}  \frac{n^2}{c^2}\frac{\partial^2}{\partial t^2}\mathbf{E} = \frac{1}{\varepsilon_0 c^2}\frac{\partial^2}{\partial t^2}\mathbf{P}^{NL}.
Nonlinearities as a wave mixing process
The nonlinear waveequation is an inhomogeneous differential equation. The general solution comes from the study of ordinary differential equations and can be solved by the use of a Green's function. Physically one gets the normal electromagnetic wave solutions to the homogeneous part of the wave equation:

\nabla^2 \mathbf{E}  \frac{n^2}{c^2}\frac{\partial^2}{\partial t^2}\mathbf{E}= 0.
and the inhomogeneous term

\frac{1}{\varepsilon_0 c^2}\frac{\partial^2}{\partial t^2}\mathbf{P}^{NL},
acts as a driver/source of the electromagnetic waves. One of the consequences of this is a nonlinear interaction that will result in energy being mixed or coupled between different frequencies which is often called a 'wave mixing'.
In general an nth order will lead to n+1th wave mixing. As an example, if we consider only a second order nonlinearity (threewave mixing), then the polarization, P, takes the form

\mathbf{P}^{NL}= \varepsilon_0 \chi^{(2)} \mathbf{E}^2(t).
If we assume that E(t) is made up of two components at frequencies ω_{1} and ω_{2}, we can write E(t) as

\mathbf{E}(t) = E_1e^{i\omega_1t}+E_2e^{i\omega_2t} + c.c.
where c.c. stands for complex conjugate. Plugging this into the expression for P gives

\begin{align} \mathbf{P}^{NL}= \varepsilon_0 \chi^{(2)} \mathbf{E}^2(t) &= \varepsilon_0 \chi^{(2)} [ E_1^2e^{i2\omega_1t}+E_2^2e^{i2\omega_2t}\\ &\qquad+2E_1E_2e^{i(\omega_1+\omega_2)t}\\ &\qquad+2E_1E_2^*e^{i(\omega_1\omega_2)t}\\ &\qquad+2\left(E_1^2+E_2^2\right)e^{0} +c.c.], \end{align}
which has frequency components at 2ω_{1},2ω_{2}, ω_{1}+ω_{2}, ω_{1}ω_{2}, and 0. These threewave mixing processes correspond to the nonlinear effects known as second harmonic generation, sum frequency generation, difference frequency generation and optical rectification respectively. Note: Parametric generation and amplification is a variation of difference frequency generation, where the lowerfrequency of one of the two generating fields is much weaker (parametric amplification) or completely absent (parametric generation). In the latter case, the fundamental quantummechanical uncertainty in the electric field initiates the process.
Phase matching
Most transparent materials, like the
BK7 glass shown here, have
normal dispersion: The
index of refraction decreases
monotonically as a function of wavelength (or increases as a function of frequency). This makes phasematching impossible in most frequencymixing processes. For example, in SHG, there is no simultaneous solution to
\omega'=2\omega and
k'=2
k in these materials.
Birefringent materials avoid this problem by having two indices of refraction at once.
^{[7]}
The above ignores the position dependence of the electrical fields. In a typical situation, the electrical fields are traveling waves described by

E_j(\mathbf{x},t) = e^{i(\mathbf{k}_j \cdot \mathbf{x}  \omega_j t)} + c.c.,
at position \mathbf{x}, with the wave vector \left \\mathbf{k}_j\right \ = n(\omega_j)\omega_j/c, where c is the velocity of light in vacuum and n(\omega_j) is the index of refraction of the medium at angular frequency \omega_j. Thus, the secondorder polarization at angular frequency \omega_3=\omega_1+\omega_2 is

P^{(2)} (\mathbf{x}, t) \propto E_1^{n_1} E_2^{n_2} e^{i ((\mathbf{k}_1 + \mathbf{k}_2)\cdot\mathbf{x}  \omega_3 t)} + c.c.
At each position \mathbf{x} within the nonlinear medium, the oscillating secondorder polarization radiates at angular frequency \omega_3 and a corresponding wave vector \left \\mathbf{k}_3\right \ = n(\omega_3)\omega_3/c. Constructive interference, and therefore a high intensity \omega_3 field, will occur only if

\vec{\mathbf{k}}_3 = \vec{\mathbf{k}}_1 + \vec{\mathbf{k}}_2.
The above equation is known as the
phase matching condition. Typically, threewave mixing is done in a birefringent crystalline material (I.e., the
refractive index depends on the polarization and direction of the light that passes through.), where the polarizations of the fields and the orientation of the crystal are chosen such that the phasematching condition is fulfilled. This phase matching technique is called angle tuning. Typically a crystal has three axes, one or two of which have a different refractive index than the other one(s). Uniaxial crystals, for example, have a single preferred axis, called the extraordinary (e) axis, while the other two are ordinary axes (o) (see
crystal optics). There are several schemes of choosing the polarizations for this crystal type. If the signal and idler have the same polarization, it is called "TypeI phasematching", and if their polarizations are perpendicular, it is called "TypeII phasematching". However, other conventions exist that specify further which frequency has what polarization relative to the crystal axis. These types are listed below, with the convention that the signal wavelength is shorter than the idler wavelength.
Phasematching types
(\lambda_p \leq \lambda_s \leq \lambda_i)
Polarizations

Scheme

Pump

Signal

Idler


e

o

o

Type I

e

o

e

Type II (or IIA)

e

e

o

Type III (or IIB)

e

e

e

Type IV

o

o

o

Type V (or Type0^{[8]} or Zero)

o

o

e

Type VI (or IIB or IIIA)

o

e

o

Type VII (or IIA or IIIB)

o

e

e

Type VIII (or I)

Most common nonlinear crystals are negative uniaxial, which means that the e axis has a smaller refractive index than the o axes. In those crystals, type I and II phasematching are usually the most suitable schemes. In positive uniaxial crystals, types VII and VIII are more suitable. Types II and III are essentially equivalent, except that the names of signal and idler are swapped when the signal has a longer wavelength than the idler. For this reason, they are sometimes called IIA and IIB. The type numbers V–VIII are less common than I and II and variants.
One undesirable effect of angle tuning is that the optical frequencies involved do not propagate collinearly with each other. This is due to the fact that the extraordinary wave propagating through a birefringent crystal possesses a Poynting vector that is not parallel with the propagation vector. This would lead to beam walkoff which limits the nonlinear optical conversion efficiency. Two other methods of phase matching avoids beam walkoff by forcing all frequencies to propagate at a 90 degree angle with respect to the optical axis of the crystal. These methods are called temperature tuning and quasiphasematching.
Temperature tuning is where the pump (laser) frequency polarization is orthogonal to the signal and idler frequency polarization. The birefringence in some crystals, in particular Lithium Niobate is highly temperature dependent. The crystal is controlled at a certain temperature to achieve phase matching conditions.
The other method is quasiphase matching. In this method the frequencies involved are not constantly locked in phase with each other, instead the crystal axis is flipped at a regular interval Λ, typically 15 micrometres in length. Hence, these crystals are called periodically poled. This results in the polarization response of the crystal to be shifted back in phase with the pump beam by reversing the nonlinear susceptibility. This allows net positive energy flow from the pump into the signal and idler frequencies. In this case, the crystal itself provides the additional wavevector k=2π/λ (and hence momentum) to satisfy the phase matching condition. Quasiphase matching can be expanded to chirped gratings to get more bandwidth and to shape an SHG pulse like it is done in a dazzler. SHG of a pump and Selfphase modulation (emulated by second order processes) of the signal and an optical parametric amplifier can be integrated monolithically.
Higherorder frequency mixing
The above holds for \chi^{(2)} processes. It can be extended for processes where \chi^{(3)} is nonzero, something that is generally true in any medium without any symmetry restrictions. Thirdharmonic generation is a \chi^{(3)} process, although in laser applications, it is usually implemented as a twostage process: first the fundamental laser frequency is doubled and then the doubled and the fundamental frequencies are added in a sumfrequency process. The Kerr effect can be described as a \chi^{(3)} as well.
At high intensities the Taylor series, which led the domination of the lower orders, does not converge anymore and instead a time based model is used. When a noble gas atom is hit by an intense laser pulse, which has an electric field strength comparable to the Coulomb field of the atom, the outermost electron may be ionized from the atom. Once freed, the electron can be accelerated by the electric field of the light, first moving away from the ion, then back toward it as the field changes direction. The electron may then recombine with the ion, releasing its energy in the form of a photon. The light is emitted at every peak of the laser light field which is intense enough, producing a series of attosecond light flashes. The photon energies generated by this process can extend past the 800th harmonic order up to a few KeV. This is called highorder harmonic generation. The laser must be linearly polarized, so that the electron returns to the vicinity of the parent ion. Highorder harmonic generation has been observed in noble gas jets, cells, and gasfilled capillary waveguides.
Example uses of nonlinear optics
Frequency doubling
One of the most commonly used frequencymixing processes is frequency doubling or secondharmonic generation. With this technique, the 1064nm output from Nd:YAG lasers or the 800nm output from Ti:sapphire lasers can be converted to visible light, with wavelengths of 532 nm (green) or 400 nm (violet), respectively.
Practically, frequencydoubling is carried out by placing a nonlinear medium in a laser beam. While there are many types of nonlinear media, the most common media are crystals. Commonly used crystals are BBO (organic polymeric materials are set to take over from crystals as they are cheaper to make, have lower drive voltages and superior performance.
Optical phase conjugation
It is possible, using nonlinear optical processes, to exactly reverse the propagation direction and phase variation of a beam of light. The reversed beam is called a conjugate beam, and thus the technique is known as optical phase conjugation^{[9]}^{[10]} (also called time reversal, wavefront reversal and retroreflection).
One can interpret this nonlinear optical interaction as being analogous to a realtime holographic process.^{[11]} In this case, the interacting beams simultaneously interact in a nonlinear optical material to form a dynamic hologram (two of the three input beams), or realtime diffraction pattern, in the material. The third incident beam diffracts off this dynamic hologram, and, in the process, reads out the phaseconjugate wave. In effect, all three incident beams interact (essentially) simultaneously to form several realtime holograms, resulting in a set of diffracted output waves that phase up as the "timereversed" beam. In the language of nonlinear optics, the interacting beams result in a nonlinear polarization within the material, which coherently radiates to form the phaseconjugate wave.
Comparison of a phase conjugate mirror with a conventional mirror. With the phase conjugate mirror the image is not deformed when passing through an aberrating element twice.
The most common way of producing optical phase conjugation is to use a fourwave mixing technique, though it is also possible to use processes such as stimulated Brillouin scattering. A device producing the phase conjugation effect is known as a phase conjugate mirror (PCM).
For the fourwave mixing technique, we can describe four beams (j = 1,2,3,4) with electric fields:

\Xi_j(\mathbf{x},t) = \frac{1}{2} E_j(\mathbf{x}) e^{i (\omega_j t  \mathbf{k}\cdot\mathbf{x})} + \mbox{c.c.}
where E_{j} are the electric field amplitudes. Ξ_{1} and Ξ_{2} are known as the two pump waves, with Ξ_{3} being the signal wave, and Ξ_{4} being the generated conjugate wave.
If the pump waves and the signal wave are superimposed in a medium with a nonzero χ^{(3)}, this produces a nonlinear polarization field:

P_{\mbox{NL}} = \epsilon_0 \chi^{(3)} (\Xi_1 + \Xi_2 + \Xi_3)^3\
resulting in generation of waves with frequencies given by ω = ±ω_{1} ±ω_{2} ±ω_{3} in addition to third harmonic generation waves with ω = 3ω_{1}, 3ω_{2}, 3ω_{3}.
As above, the phasematching condition determines which of these waves is the dominant. By choosing conditions such that ω = ω_{1} + ω_{2}  ω_{3} and k = k_{1} + k_{2}  k_{3}, this gives a polarization field:

P_\omega = \frac{1}{2} \chi^{(3)} \epsilon_0 E_1 E_2 E_3^* e^{i(\omega t  \mathbf{k} \cdot \mathbf{x} ) } + \mbox{c.c.}.
This is the generating field for the phase conjugate beam, Ξ_{4}. Its direction is given by k_{4} = k_{1} + k_{2}  k_{3}, and so if the two pump beams are counterpropagating (k_{1} = k_{2}), then the conjugate and signal beams propagate in opposite directions (k_{4} = k_{3}). This results in the retroreflecting property of the effect.
Further, it can be shown for a medium with refractive index n and a beam interaction length l, the electric field amplitude of the conjugate beam is approximated by

E_4 = \frac{i \omega l}{2 n c} \chi^{(3)} E_1 E_2 E_3^*
(where c is the speed of light). If the pump beams E_{1} and E_{2} are plane (counterpropagating) waves, then:

E_4(\mathbf{x}) \propto E_3^*(\mathbf{x});
that is, the generated beam amplitude is the complex conjugate of the signal beam amplitude. Since the imaginary part of the amplitude contains the phase of the beam, this results in the reversal of phase property of the effect.
Note that the constant of proportionality between the signal and conjugate beams can be greater than 1. This is effectively a mirror with a reflection coefficient greater than 100%, producing an amplified reflection. The power for this comes from the two pump beams, which are depleted by the process.
The frequency of the conjugate wave can be different from that of the signal wave. If the pump waves are of frequency ω_{1} = ω_{2} = ω, and the signal wave higher in frequency such that ω_{3} = ω + Δω, then the conjugate wave is of frequency ω_{4} = ω — Δω. This is known as frequency flipping.
Common SHG materials
(Second Harmonic Generation)
DarkRed Gallium Selenide in its bulk form.
See also
Notes

^ http://www.nature.com/nature/journal/v396/n6712/abs/396653a0.html

^ http://prl.aps.org/abstract/PRL/v76/i17/p3116_1

^ http://pop.aip.org/phpaen/v12/i9/p093106_s1

^ http://www.nature.com/nphys/journal/v3/n6/full/nphys595.html

^ Paschotta, Rüdiger. "Parametric Nonlinearities".

^ See Section Parametric versus Nonparametric Processes, Nonlinear Optics by Robert W. Boyd (3rd ed.), pp. 1315.

^ Robert W. Boyd, Nonlinear optics, Third edition, Chapter 2.3.

^ Abolghasem, Payam; Junbo Han; Bhavin J. Bijlani; Amr S. Helmy (2010). "Type0 second order nonlinear interaction in monolithic waveguides of isotropic semiconductors". Optics Express 18 (12): 12681–12689.

^ Scientific American, December 1985, "Phase Conjugation," by Vladimir Shkunov and Boris Zel'dovich.

^ Scientific American, January 1986, "Applications of Optical Phase Conjugation," by David M. Pepper.

^ Scientific American, October 1990, "The Photorefractive Effect," by David M. Pepper, Jack Feinberg, and Nicolai V. Kukhtarev.
References



Agrawal, Govind (2006). Nonlinear Fiber Optics (4th ed.). Academic Press.
External links

Encyclopedia of laser physics and technology, with content on nonlinear optics, by Rüdiger Paschotta

An Intuitive Explanation of Phase Conjugation

AdvR  NLO Frequency Conversion in KTP Waveguides

SNLO  Nonlinear Optics Design Software

Topics on photophysics and nonlinear optics


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