In mathematics, Bäcklund transforms or Bäcklund transformations (named after the Swedish mathematician Albert Victor Bäcklund) relate

partial differential equation In mathematics, a partial differential equation (PDE) is an equation which imposes relations between the various partial derivatives of a multivariable function. The function is often thought of as an "unknown" to be solved for, similarly to ...

s and their solutions. They are an important tool in

soliton theory In mathematics and physics, a soliton or solitary wave is a self-reinforcing wave packet that maintains its shape while it propagates at a constant velocity. Solitons are caused by a cancellation of nonlinear and dispersive effects in the medi ...

and

integrable system In mathematics, integrability is a property of certain dynamical systems. While there are several distinct formal definitions, informally speaking, an integrable system is a dynamical system with sufficiently many conserved quantities, or first i ...

s. A Bäcklund transform is typically a system of first order partial differential equations relating two functions, and often depending on an additional parameter. It implies that the two functions separately satisfy partial differential equations, and each of the two functions is then said to be a Bäcklund transformation of the other. A Bäcklund transform which relates solutions of the ''same'' equation is called an invariant Bäcklund transform or auto-Bäcklund transform. If such a transform can be found, much can be deduced about the solutions of the equation especially if the Bäcklund transform contains a parameter. However, no systematic way of finding Bäcklund transforms is known.

History

Bäcklund transforms have their origins in differential geometry: the first nontrivial example is the transformation of pseudospherical surfaces introduced by L. Bianchi and A.V. Bäcklund in the 1880s. This is a geometrical construction of a new pseudospherical surface from an initial such surface using a solution of a

linear differential equation In mathematics, a linear differential equation is a differential equation that is defined by a linear polynomial in the unknown function and its derivatives, that is an equation of the form :a_0(x)y + a_1(x)y' + a_2(x)y'' \cdots + a_n(x)y^ ...

. Pseudospherical surfaces can be described as solutions of the sine-Gordon equation, and hence the Bäcklund transformation of surfaces can be viewed as a transformation of solutions of the sine-Gordon equation.

The Cauchy–Riemann equations

The prototypical example of a Bäcklund transform is the Cauchy–Riemann system :

u_x=v_y, \quad u_y=-v_x,\,

which relates the real and imaginary parts

u

and

v

of a

holomorphic function In mathematics, a holomorphic function is a complex-valued function of one or more complex variables that is complex differentiable in a neighbourhood of each point in a domain in complex coordinate space . The existence of a complex de ...

. This first order system of partial differential equations has the following properties. # If

u

and

v

are solutions of the Cauchy–Riemann equations, then

u

is a solution of the

Laplace equation In mathematics and physics, Laplace's equation is a second-order partial differential equation named after Pierre-Simon Laplace, who first studied its properties. This is often written as \nabla^2\! f = 0 or \Delta f = 0, where \Delta = \na ...

u_ + u_ = 0

(i.e., a

harmonic function In mathematics, mathematical physics and the theory of stochastic processes, a harmonic function is a twice continuously differentiable function f: U \to \mathbb R, where is an open subset of that satisfies Laplace's equation, that is, ...

), and so is

v

. This follows straightforwardly by differentiating the equations with respect to

x

and

y

and using the fact that

u_=u_, \quad v_=v_.\,

# Conversely if

u

is a solution of Laplace's equation, then there exist functions

v

which solve the Cauchy–Riemann equations together with

u

. Thus, in this case, a Bäcklund transformation of a harmonic function is just a

conjugate harmonic function In mathematics, a real-valued function u(x,y) defined on a connected open set \Omega \subset \R^2 is said to have a conjugate (function) v(x,y) if and only if they are respectively the real and imaginary parts of a holomorphic function f(z) of ...

. The above properties mean, more precisely, that Laplace's equation for

u

and Laplace's equation for

v

are the

integrability condition In mathematics, certain systems of partial differential equations are usefully formulated, from the point of view of their underlying geometric and algebraic structure, in terms of a system of differential forms. The idea is to take advantage of t ...

s for solving the Cauchy–Riemann equations. These are the characteristic features of a Bäcklund transform. If we have a partial differential equation in

u

, and a Bäcklund transform from

u

v

, we can deduce a partial differential equation satisfied by

v

. This example is rather trivial, because all three equations (the equation for

u

, the equation for

v

and the Bäcklund transform relating them) are linear. Bäcklund transforms are most interesting when just one of the three equations is linear.

The sine-Gordon equation

Suppose that ''u'' is a solution of the sine-Gordon equation :

u_ = \sin u.\,

Then the system :

\begin
v_x & = u_x + 2a \sin \Bigl( \frac \Bigr) \\
v_y & = -u_y + \frac \sin \Bigl( \frac \Bigr)
\end \,\!

where ''a'' is an arbitrary parameter, is solvable for a function ''v'' which will also satisfy the sine-Gordon equation. This is an example of an auto-Bäcklund transform. By using a matrix system, it is also possible to find a linear Bäcklund transform for solutions of sine-Gordon equation.

The Liouville equation

A Bäcklund transform can turn a non-linear partial differential equation into a simpler, linear, partial differential equation. For example, if ''u'' and ''v'' are related via the Bäcklund transform :

\begin
v_x & = u_x + 2a \exp \Bigl( \frac \Bigr) \\
v_y & = -u_y - \frac \exp \Bigl( \frac \Bigr)
\end \,\!

where ''a'' is an arbitrary parameter, and if ''u'' is a solution of the Liouville equation

u_=\exp u \,\!

then ''v'' is a solution of the much simpler equation,

v_=0

, and vice versa. We can then solve the (non-linear) Liouville equation by working with a much simpler linear equation.

References

* * *
excerpt
* A. D. Polyanin and V. F. Zaitsev, ''Handbook of Nonlinear Partial Differential Equations'', Chapman & Hall/CRC Press, 2004.

External links

* * {{DEFAULTSORT:Backlund Transform Differential geometry Solitons Exactly solvable models Surfaces Transforms Integrable systems