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Kundu-Eckhaus Equation

A generalization of nonlinear Schroedinger equation with additional quintic nonlinerity and a nonlinear dispersive term was proposed in ^[1] in the form

${\displaystyle \psi _{t}+\psi _{xx}-2\beta |\psi |^{2}q+\delta ^{2}|\psi |^{4}\psi \pm 2i\delta (|\psi |^{2})_{x}\psi =0,......(3)}$

which may be obtained from the Kundu Equation (2), when restricted to ${\displaystyle \alpha =0}$. The same equation, limited further to the particular case ${\displaystyle \beta =0,}$ was introduced later as Eckhaus equation, following which equation (3) is presently known as the Kundu-Ekchaus eqution. The Kundu-Ekchaus equation can be reduced to the nonlinear Schroedinger equation through a nonlinear transformation of the field and known therefore to be gauge equivalent integrable systems, since they are equivalent under the gauge transformation.

Properties and Applications

the Kundu-Ekchaus equation is asociated with a Lax pair, higher conserved quantity, exact soliton solution, rogue wave solution etc. Over the years various aspects of this equation, its generalizations and link with other equations have been studied. In particular, relationship of Kundu-Ekchaus equation with the Johnson's hydrodynamic equation near criticality is established^[2] , its discretizations ^[3] , reduction via [[Lie symmetry]] ^[4] , complex structure via Bernoulli subequation ^[5] , bright and dark [[soliton solutions] via Baecklund transfomation ^[6] and Darbaux transformation ^[7] with the associated rogue wave solutions ^[8] ,^[9] are studied.

RKL equation

A multi-component generalisation of the Kundu-Ekchaus equation (3), known as Radhakrishnan, Kundu and Laskshmanan (RKL) equation was proposed in nolinear optics for fiber communication through [[solitonic pulses]] in a birefringent non-Kerr medium ^[10] and analysed subsequently for its exact soliton solution and other aspects in a series of papers^[11] , ^[12] ,^[13] , ^[13] ±===Quantum Aspect=== Though the Kundu-Ekchaus equation (3) is gauge equivalent to the nonlinear Schroedinger equation, they differ in an interesting way with respect to their Hamiltinian structures and field commutation relations. The Hamiltonian operator of the Kundu-Ekchaus equation quantum field model given by

${\displaystyle {H}=\int dx\left[:\left((\psi _{x}^{\dagger }\psi _{x}+c\rho ^{2}+i\delta \rho (\psi ^{\dagger }\psi _{x}-\psi _{x}^{\dagger }\psi )\right):+\delta ^{2}(\psi ^{\dagger }\rho ^{2}\psi )\right],\ \ \ \ \rho \equiv (\psi ^{\dagger }\psi )}$

and defined through the bosonic field operatorcommutation relation ${\displaystyle [\psi (x),\psi ^{\dagger }(y)]=\delta (x-y)}$, is more complicated than the well known bosonic Hamiltonian of the quantum [[nonlinear Schroedinger equation]]. Here ${\displaystyle \ :\ \ :\ }$ indicates normal ordering in [[bosonic operators]]. This model corresponds to a double $\delta $ function interacting bose gas and difficult to solve directly.

one-dimensional Anyon gas

However under a nonlinear transformation of the field

${\displaystyle {\tilde {\psi }}(x)=e^{-i\delta \int _{-\infty }^{x}\psi ^{\dagger }(x')\psi (x')dx'}\psi (x)}$

the model can be transformed to

${\displaystyle {\tilde {H}}=\int dx\vdots \left({\tilde {\psi }}_{x}^{\dagger }{\tilde {\psi }}_{x}+\beta ({\tilde {\psi }}^{\dagger }{\tilde {\psi }})^{2}\right)\vdots ,}$

i.e. in the same form as the quantum model of [[nonlinear Schroedinger equation]] (NLSE), though it differs from the NLSE in its contents , since now the fields involved are no longer bosonic operators but exhibit anyon like properties

${\displaystyle {\tilde {\psi }}^{\dagger }(x_{1}){\tilde {\psi }}^{\dagger }(x_{2})=e^{i\delta \epsilon (x_{1}-x_{2})}{\tilde {\psi }}^{\dagger }(x_{2}){\tilde {\psi }}^{\dagger }(x_{1}),\ {\tilde {\psi }}(x_{1}){\tilde {\psi }}^{\dagger }(x_{2})=e^{-i\delta \epsilon (x_{1}-x_{2})},}$

${\displaystyle {\tilde {\psi }}^{\dagger }(x_{2}){\tilde {\psi }}(x_{1})+\delta (x_{1}-x_{2})}$

etc. where

${\displaystyle \epsilon (x-y)=+\ ,-,0\ }$ for ${\displaystyle \ x>y,\ x<y,\ \ x=y,}$

though at the coinciding poiints the bosonic commutation relation still holds. In analogy with the Lieb Limiger model of $ \delta $ function bose gas, the quantum Kundu-Ekchaus model in the N-particle sector therefore corresponds to an one-dimensional (1D) anyon gas interacting via a $ \delta$ function interaction. This model of interacting anyon gas was proposed and eaxctly solved by the Bethe ansatz in ^[14] and this basic anyon model is studied further for investigating various aspects of the 1D anyon gas as well as extended in different directions ^[15] , ^[16] , ^[17], ^[18], ^[19]

1. Cite error: The named reference Template:Kundu was invoked but never defined (see the help page).
2. Kundu, A. (1987), "Exact solutions in higher order nonlinear equations gauge transformation", Physica D, 25: 399–406 {{citation}}: line feed character in |title= at position 54 (help)
3. Levi, D.; Scimiterna, C. (2009), "The Kundu–Eckhaus equation and its discretizations", J. Phys. A
4. Toomanian; Asadi (2013), "Reductions for Kundu-Eckhaus equation via Lie symmetry analysis", Math. Sciences, 7: 50
5. Beokonus, H. M.; Bulut, Q. H. (2015), "On the complex structure of Kundu-Eckhaus equation via Bernoulli subequation fungtion method", Waves in Random and Complex Media, 28 Aug. {{citation}}: line feed character in |title= at position 57 (help)
6. Wang,, H. P.; al., et. (2015), "Bright and Dark solitons and Baecklund transfomation for the Kundu–Eckhaus equation", Appl. Math. Comp., 251: 233 {{citation}}: line feed character in |title= at position 62 (help)
7. Qui, D.; al., et. (2015), "The Darbaux transformation and the Kundu–Eckhaus equation", Proc. Royal Soc. Lond. A, 451: 20150236 {{citation}}: line feed character in |title= at position 4 (help)
8. Wang, Xin; al., et. (2014), "Higher-order rogue wave solutions of the Kundu–Eckhaus equation", Phys. Scr., 89: 095210
9. Ohta, Y.; Yang, J. (2012), "General higher order rogue waves and their dynamics in the NLS equation", Proc. Royal Soc. Lond. A, 468: 1716
10. Radhakrishnan, R.; Kundu, A.; Lakshmanan, M. (1999), "Coupled nonlinear Schr\"odinger equations with cubic-quintic nonlinearity: integrability and soliton interaction in non-Kerr media", Phys. Rev. E, 60: 3314 {{citation}}: line feed character in |title= at position 61 (help)
11. Biswas, A. (2009), "1-soliton solution of the generalized Radhakrishnan, Kundu, Lakshmanan equation", Physics Letters A, 373: 2546
12. Zhang, J. L.; Wang, M. L. (2008), "Various exact solutions for two special type RKL models", Chaos Solitons Fractals, 37: 215
13. Ganji, D. D.; al., et. (2008), "Exp-function based solution of nonlinear Radhakrishnan, Kundu and Laskshmanan (RKL) equation", Acta Appl. Math., 104: 201 {{citation}}: line feed character in |title= at position 63 (help) {{broken ref |prefix=Cite error: The named reference "Template:" was defined multiple times with different content (see the help page).
14. Kundu, A. (1999), "Exact solution of double-delta function Bose gas through interacting anyon gas", Phys. Rev. Lett., 83: 1275 {{citation}}: line feed character in |title= at position 69 (help)
15. Batchelor, M.T.; Oelkers, X. W.. (2006), "One-dimensional interacting anyon gas: low energy properties and Haldane exclusion statistics", Phys. Rev. Lett., 96: 210402 {{citation}}: |first3= missing |last3= (help); line feed character in |title= at position 73 (help)
16. Girardeau, M. D. (2006), "Anyon-fermion mapping and applications to ultracold gasses in tight waveguides", Phys. Rev. Lett., 97: 100402
17. Averin, D. V.; Nesteroff, J. A. (2007), "Coulomb blockade of anyons in quantum antidots", Phys. Rev. Lett., 99: 096801 {{citation}}: line feed character in |title= at position 20 (help)
18. Pˆatu, O.I.; Korepin, V. E.; Averin, D. V. (2008), "One-dimensional impenetrable anyons in thermal equillibrium. I. Anyonic generalizations of Lenard's formula", J. Phys. A, 41: 145006 {{citation}}: line feed character in |title= at position 39 (help)
19. Calabrese, P.; Mintchev, M. (2007), "Correlation functions of one-dimensional anyonic fluids", Phys. Rev. B, 75: 233104