Inverse scattering transform

In mathematics, the inverse scattering transform is a method for solving some non-linear partial differential equations. It is one of the most important developments in mathematical physics in the past 40 years. The method is a non-linear analogue of the Fourier transform, which itself can be applied to solve many linear partial differential equations.

The inverse scattering transform may be applied to many of the so-called exactly solvable models, that is to say completely integrable infinite dimensional systems. These include the Korteweg–de Vries equation, the nonlinear Schrödinger equation, the coupled nonlinear Schrödinger equations, the Sine-Gordon equation, the Kadomtsev-Petviashvili equation, the Toda lattice equation, the Ishimori equation, the Dym equation etc.

A characteristic of solutions obtained by the inverse scattering method is the existence of solitons which have no analogue for linear partial differential equations. The term "soliton" arises from non-linear optics.

The inverse scattering problem can be written as a Riemann-Hilbert factorization problem. This formulation can be generalized to differential operators of order greater than 2 and also to periodic potentials.

Example: the Korteweg-de Vries equation

The Korteweg-de Vries equation is a nonlinear, dispersive, evolution partial differential equation for a function "u"; of two real variables, one space variable "x" and one time variable "t" :

:$frac\{partial\; u\}\{partial\; t\}-\; 6,\; u,\; frac\{partial\; u\}\{partial\; x\}+frac\{partial^3\; u\}\{partial\; x^3\}\; =0,,$

with $frac\{partial\; u\}\{partial\; t\}$ and $frac\{partial\; u\}\{partial\; x\}$ denoting partial derivatives with respect to "t" and "x".

To solve the initial value problem for this equation where $u(0,x)$ is a known function of "x", one associates to this equation the Schrödinger eigenvalue equation

:$frac\{partial^2\; psi\}\{partial\; x^2\}-u(x,t)psi=lambdapsi.$

where $psi$ is an unknown function of "t" and "x" and "u" is the solution of the Korteweg-de Vries equation that is unknown except at $t=0$. The constant $lambda$ is an eigenvalue.

From the Schrödinger equation we obtain :$u=frac$frac{partial^2 psi}{partial x^2}{psi}-lambda.

Substituting this into the Korteweg-de Vries equation and integrating gives the equation

:$frac\{partial\; psi\}\{partial\; t\}+frac\{partial^3\; psi\}\{partial\; x^3\}-3(u-lambda)frac\{partial\; psi\}\{partial\; x\}=Cpsi+Dpsiint\; frac\{dx\}\{psi^2\}$

where "C" and "D" are constants.

Method of solution

Step 1. Determine the nonlinear partial differential equation. This is usually accomplished by analyzing the physics of the situation being studied.

Step 2. Employ "forward scattering". This consists of finding the Lax pair. The Lax pair consists of two linear operators, $L$ and $M$, such that $Lv=lambda\; v$ and $v\_\{t\}=Mv.$ It is extremely important that the eigenvalue $lambda$ be independent of time; i.e. $lambda\_\{t\}=0.$ Necessary and sufficient conditions for this to occur are determined as follows: take the time derivative of $Lv=lambda\; v$ to obtain

:$L\_\{t\}v+Lv\_\{t\}=lambda\_\{t\}v+lambda\; v\_\{t\}.$

Plugging in $Mv$ for $v\_\{t\}$ yields

:$L\_\{t\}v+LMv=lambda\_\{t\}v+lambda\; Mv.$

Rearranging on the far right term gives us

:$L\_\{t\}v+LMv=lambda\_\{t\}v+MLv.$

Thus,

:$L\_\{t\}v+LMv-MLv=lambda\_\{t\}v.$

Since $v\; ot=0$, this implies that $lambda\_\{t\}=0$ if and only if

:$L\_\{t\}+LM-ML=0.$

This is Lax's equation. One important thing to note about Lax's equation is that $L\_\{t\}$ is the time derivative of $L$ precisely where it explicitly depends on $t$. The reason for defining the differentiation this way is motivated by the simplest instance of $L$, which is the Schrödinger operator (see Schrödinger equation):

:$L=frac\{d^\{2\{dx^\{2+u,$

where u is the "potential". Comparing the expression $L\_\{t\}v+Lv\_\{t\}$ with $frac\{partial\}\{partial\; t\}left(frac\{d^\{2\}v\}\{dx^\{2+uv\; ight)$ shows us that $frac\{partial\; L\}\{partial\; t\}=u\_\{t\},$ thus ignoring the first term.

After concocting the appropriate Lax pair it should be the case that Lax's equation recovers the original nonlinear PDE.

Step 3. Determine the time evolution of the eigenfunctions associated to each eigenvalue $lambda,$, the norming constants, and the reflection coefficient, all three comprising the so-called scattering data. This time evolution is given by a system of linear ordinary differential equations which can be solved.

Step 4. Perform the "inverse scattering" procedure by solving the Gelfand-Levitan-Marchenko integral equation, a linear integral equation, to obtain the final solution of the original nonlinear PDE. All the scattering data is required in order to do this. Note that if the reflection coefficient is zero, the process becomes much easier. Note also that this step works if $L$ is a differential or difference operator of order two, but not necessarily for higher orders. In all cases however, the "inverse scattering" problem is reducible to a Riemann-Hilbert factorization problem.(See Ablowitz-Clarkson (1991) for either approach.)

List of integrable equations

* Korteweg–de Vries equation
* nonlinear Schrödinger equation
* Sine-Gordon equation
* Ishimori equation
* Dym equation and so on.

References

*M. Ablowitz, H. Segur, "Solitons and the Inverse Scattering Transform", SIAM, Philadelphia, 1981.
*N. Asano, Y. Kato, "Algebraic and Spectral Methods for Nonlinear Wave Equations", Longman Scientific & Technical, Essex, England, 1990.
*M. Ablowitz, P. Clarkson, "Solitons, Nonlinear Evolution Equations and Inverse Scattering", Cambridge University Press, Cambridge, 1991.
*J. Shaw, "Mathematical Principles of Optical Fiber Communications", SIAM, Philadelphia, 2004.
* Eds: R.K. Bullough, P.J. Caudrey. "Solitons" Topics in Current Physics 17. Springer Verlag, Berlin-Heidelberg-New York, 1980.

External links

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