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{{short description|Phenomenon whereby deviations from a periodic waveform are reinforced by nonlinearity}}
In the fields of [[nonlinear optics]] and [[fluid dynamics]], '''modulational instability''' or '''sideband instability''' is a phenomenon whereby deviations from a periodic waveform are reinforced by nonlinearity, leading to the generation of [[Frequency spectrum|spectral]]-sidebands and the eventual breakup of the waveform into a train of [[wave packet|pulses]].<ref name="BenjaminFeir">{{cite journal
| doi = 10.1017/S002211206700045X
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| journal = Journal of Fluid Mechanics
| year = 1967
|bibcode = 1967JFM....27..417B | s2cid = 121996479
}}</ref><ref>{{Cite journal | doi = 10.1098/rspa.1967.0123
| volume = 299
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| series = A. Mathematical and Physical Sciences
| year = 1967
|bibcode = 1967RSPSA.299...59B | s2cid = 121661209
}} Concluded with a discussion by [[Klaus Hasselmann]].</ref><ref name="agrawal">{{cite book | last = Agrawal
| first = Govind P.
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| publisher = Academic Press
| edition =2nd
| isbn = 978-0-12-045142-5
}}</ref>
| doi = 10.1146/annurev.fl.12.010180.001511
| volume = 12
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| journal = Annual Review of Fluid Mechanics
| year = 1980
|bibcode = 1980AnRFM..12..303Y }}</ref> Therefore, it is also known as the '''Benjamin−Feir instability'''. However, spatial modulation instability of high-power lasers in organic solvents was observed by Russian scientists N. F. Piliptetskii and A. R. Rustamov in 1965,<ref>{{Cite journal|last1=Piliptetskii|first1=N. F.|last2=Rustamov|first2=A. R.|date=31 May 1965|title=Observation of Self-focusing of Light in Liquids|url=http://www.jetpletters.ac.ru/ps/1596/article_24469.shtml|journal=JETP Letters|volume=2|issue=2|pages=55–56}}</ref> and the mathematical derivation of modulation instability was published by V. I. Bespalov and V. I. Talanov in 1966.<ref>{{Cite journal|last1=Bespalov|first1=V. I.|last2=Talanov|first2=V. I.|date=15 June 1966|title=Filamentary Structure of Light Beams in Nonlinear Liquids|url=http://www.jetpletters.ac.ru/ps/1621/article_24803.shtml|journal=ZhETF Pisma Redaktsiiu|volume=3|issue=11|pages=471–476|bibcode=1966ZhPmR...3..471B|access-date=17 February 2021|archive-date=31 July 2020|archive-url=https://web.archive.org/web/20200731112029/http://www.jetpletters.ac.ru/ps/1621/article_24803.shtml|url-status=dead}}</ref> Modulation instability is a possible mechanism for the generation of [[rogue wave]]s.<ref>{{Cite journal
| doi = 10.1175/1520-0485(2003)33<863:NFIAFW>2.0.CO;2
| volume = 33
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| journal = Journal of Physical Oceanography
| year = 2003
|bibcode = 2003JPO....33..863J | doi-access = free
}}</ref><ref>{{Cite journal | doi = 10.1146/annurev.fluid.40.111406.102203
| volume = 40
| issue = 1
| pages = 287–310
| last1 = Dysthe
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==Initial instability and gain==
Modulation instability only happens under certain circumstances. The most important condition is ''anomalous group velocity [[dispersion relation|dispersion]]'', whereby pulses with shorter [[wavelength]]s travel with higher [[group velocity]] than pulses with longer wavelength.<ref name="agrawal" /> (This condition assumes a ''
The instability is strongly dependent on the frequency of the perturbation. At certain frequencies, a perturbation will have little effect,
The tendency of a perturbing signal to grow makes modulation instability a form of [[amplifier|amplification]]. By tuning an input signal to a peak of the gain spectrum, it is possible to create an [[optical amplifier]].
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===Mathematical derivation of gain spectrum===
The gain spectrum can be derived <ref name="agrawal" /> by starting with a model of modulation instability based upon the [[nonlinear Schrödinger equation]]{{what|reason=Time and space reversed?|date=February 2024}}
: <math>\frac{\partial A}{\partial z} + i\beta_2\frac{\partial^2A}{\partial t^2} = i\gamma|A|^2A,</math>
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This dispersion relation is vitally dependent on the sign of the term within the square root, as if positive, the wavenumber will be [[real number|real]], corresponding to mere [[oscillation]]s around the unperturbed solution, whilst if negative, the wavenumber will become [[imaginary number|imaginary]], corresponding to exponential growth and thus instability. Therefore, instability will occur when
:<math>\beta_2^2\omega_m^2 + 2 \gamma P \beta_2 < 0,</math> {{pad|2em}} that is for {{pad|2em}} <math>\omega_m^2 < -2 \frac{\gamma P}{\beta_2}.</math>
This condition describes the requirement for anomalous dispersion (such that <math>\gamma\beta_2</math> is negative). The gain spectrum can be described by defining a gain parameter as <math>g \equiv 2|\Im\{k_m\}|,</math> so that the power of a perturbing signal grows with distance as <math>P\, e^{g z}.</math> The gain is therefore given by
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where as noted above, <math>\omega_m</math> is the difference between the frequency of the perturbation and the frequency of the initial light. The growth rate is maximum for <math>\omega^2=-\gamma P/\beta_2.</math>
== Modulation
Modulation instability of optical fields has been observed in photo-chemical systems, namely, photopolymerizable medium.<ref>{{Cite journal|
==References==
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| first1 = V.E.
| author1-link = Vladimir E. Zakharov
| first2 = L.A.
| last2 = Ostrovsky
| title = Modulation instability: The beginning
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| year = 2009
| url = http://www.math.umass.edu/~kevrekid/math697/sdarticle_ZO.pdf
| bibcode = 2009PhyD..238..540Z
}}{{Dead link|date=April 2020 |bot=InternetArchiveBot |fix-attempted=yes }}
{{physical oceanography}}
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[[Category:Photonics]]
[[Category:Water waves]]
[[Category:Fluid dynamic instabilities]]
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