Jump to content

Change of variables (PDE)

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by Oo7565 (talk | contribs) at 23:30, 22 July 2008 ("rem AfD - kept; unreferenced template also removed per discussion at afd"). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

Often a partial differential equation can be reduced to a simpler form with a known solution by a suitable change of variables.

Change of variable for integral equations is discussed in Integration by substitution.

The article below discusses change of variable for PDEs in two ways:

  1. By example
  2. By giving the theory of the method

Technique explained by example

For example the following simplified form of the Black–Scholes PDE

is reducible to the Heat equation

by the change of variables[1]:

in these steps:

  • Replace by and apply the chain rule to get
  • Replace and by and to get
  • Replace and by and and divide both sides by to get
  • Replace by and divide through by to yield the heat equation.

Advice on the application of change of variable to PDEs is given by mathematician J. Michael Steele[2]:

"There is nothing particularly difficult about changing variables and transforming one equation to another, but there is an element of tedium and complexity that slows us down. There is no universal remedy for this molasses effect, but the calculations do seem to go more quickly if one follows a well-defined plan. If we know that satisfies an equation (like the Black-Scholes equation) we are guaranteed that we can make good use of the equation in the derivation of the equation for a new function defined in terms of the old if we write the old V as a function of the new v and write the new t and x as functions of the old t and S. This order of things puts everything in the direct line of fire of the chain rule; the partial derivatives , and are easy to compute and at the end, the original equation stands ready for immediate use."

Technique in general

Suppose that we have a function and a change of variables such that there exist functions such that

and functions such that

and furthermore such that

and

In other words, it is helpful for there to be a bijection between the old set of variables and the new one, or else one has to

  • Restrict the domain of applicability of the correspondence to a subject of the real plane which is sufficient for a solution of the practical problem at hand (where again it needs to be a bijection), and
  • Enumerate the (zero or more finite list) of exceptions (poles) where the otherwise-bijection fails (and say why these exceptions don't restrict the applicability of the solution of the reduced equation to the original equation)

If a bijection does not exist then the solution to the reduced-form equation will not in general be a solution of the original equation.

We are discussing change of variable for PDEs. A PDE can be expressed as a differential operator applied to a function. Suppose is a differential operator such that

Then it is also the case that

where

and we operate as follows to go from to

  • Apply the chain rule to and expand out giving equation .
  • Substitute for and for in and expand out giving equation .
  • Replace occurrences of by and by to yield , which will be free of and .

Action-angle coordinates

Often, theory can establish the existence of a change of variables, although the formula itself cannot be explicitly stated. For a integrable Hamiltonian system of dimension , with and , there exist integrals . There exists a change of variables from the coordinates to a set of variables , in which the equations of motion become , , where the functions are unknown, but depend only on . The variables are the action coordinates, the variables are the angle coordinates. The motion of the system can thus be visualized as rotation on torii. As a particular example, consider the simple harmonic oscillator, with and , with Hamiltonian . This system can be rewritten as , , where and are the canonical polar coordinates: and . See V. I. Arnold, `Mathematical Methods of Classical Mechanics,' for more details.

References

  1. ^ Solution of the Black Scholes Equation
  2. ^ J. Michael Steele, Stochastic Calculus and Financial Applications, Springer, New York, 2001