mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

, the Darboux transformation, named after

Gaston Darboux Jean-Gaston Darboux FAS MIF FRS FRSE (14 August 1842 – 23 February 1917) was a French mathematician. Life According to his birth certificate, he was born in Nîmes in France on 14 August 1842, at 1 am. However, probably due to the midn ...

(1842–1917), is a method of generating a new equation and its solution from the known ones. It is widely used in inverse scattering theory, in the theory of

orthogonal polynomials In mathematics, an orthogonal polynomial sequence is a family of polynomials such that any two different polynomials in the sequence are orthogonal In mathematics, orthogonality (mathematics), orthogonality is the generalization of the geom ...

, and as a way of constructing

soliton In mathematics and physics, a soliton is a nonlinear, self-reinforcing, localized wave packet that is , in that it preserves its shape while propagating freely, at constant velocity, and recovers it even after collisions with other such local ...

solutions of the KdV hierarchy. From the operator-theoretic point of view, this method corresponds to the factorization of the initial second order differential operator into a product of first order differential expressions and subsequent exchange of these factors, and is thus sometimes called the single commutation method in mathematics literature. The Darboux transformation has applications in supersymmetric quantum mechanics.

History

The idea goes back to

Carl Gustav Jacob Jacobi Carl Gustav Jacob Jacobi (; ; 10 December 1804 – 18 February 1851) was a German mathematician who made fundamental contributions to elliptic functions, dynamics, differential equations, determinants and number theory. Biography Jacobi was ...

Method

Let

y = y(x)

be a solution of the equation :

-y''(x) + q(x)y(x) = \lambda y(x)

and

y = z(x)

be a fixed strictly positive solution of the same equation for some

\lambda = \lambda_0

. Then for

\lambda \ne \lambda_0

, :

Y(x) := y'(x) - \fracy(x) = z(x) \left( \frac \right)'

is a solution of the equation :

-Y''(x) + Q(x)Y(x) = \lambda Y(x),

where

Q(x) = q(x) - 2\left( \frac \right)'.

Also, for

\lambda = \lambda_0

, one solution of the latter differential equation is

1/z(x)

and its general solution can be found by d’Alembert's method: :

Y(x) = \frac \left( C_1 + C_2 \int^x z^2(x) dx \right),

where

C_1

and

C_2

are arbitrary constants.

Eigenvalue problems

Darboux transformation modifies not only the differential equation but also the boundary conditions. This transformation makes it possible to reduce eigenparameter-dependent boundary conditions to boundary conditions independent of the eigenvalue parameter – one of the

Dirichlet Johann Peter Gustav Lejeune Dirichlet (; ; 13 February 1805 – 5 May 1859) was a German mathematician. In number theory, he proved special cases of Fermat's last theorem and created analytic number theory. In Mathematical analysis, analysis, h ...

Neumann Neumann () is a German language, German surname, with its origins in the pre-7th-century (Old English) word ''wikt:neowe, neowe'' meaning "new", with ''wikt:mann, mann'', meaning man. The English form of the name is Newman. Von Neumann is a varian ...

Robin Robin most commonly refers to several species of passerine birds. Robin may also refer to: Animals * Australasian robins, red-breasted songbirds of the family Petroicidae * Many members of the subfamily Saxicolinae (Old World chats), inclu ...

conditions. On the other hand, it also allows one to convert inverse square singularities to Dirichlet boundary conditions and vice versa. Thus Darboux transformations relate eigenparameter-dependent boundary conditions with inverse square singularities.

References

{{reflist Theoretical physics Ordinary differential equations