0
$\begingroup$

Problem:

Try to simplify $x^2\frac{\partial^2w}{\partial x^2}+y^2\frac{\partial^2w}{\partial y^2}+z^2\frac{\partial^2w}{\partial z^2}+yz\frac{\partial^2w}{\partial y\partial z}+zx\frac{\partial^2w}{\partial z\partial x}+xy\frac{\partial^2w}{\partial x\partial y}=0$ with transform $x=uv, y=vt, z=tu$, where $w$ is well-behaved enough.


Source: Григорий Михайлович Фихтенгольц


I found the method on the book (differentiating the equations in the transform to solve out $\partial w/\partial x$, etc) not easy to solve this problem, with a horrendous calculation. I wonder whether there's a sensible way to deal with the problem, without too pain and loss of rigor, for example, $\vartheta_s=s\dfrac\partial{\partial s}$?

Any help? Thanks!

  • 0
    @LeonidKovalev No $2$ stated. Robert Israel's answer is right, but I'm looking for a method not an answer.2012-06-30

1 Answers 1

0

Assuming you meant $z=tu$, here's how Maple does it:

W:= w(x,y,z);

Q:= x^2*diff(W,x,x) + y^2*diff(W,y,y) + z^2*diff(W,z,z) + x*y*diff(W,x,y) + y*z*diff(W,y,z) + x*z*diff(W,x,z);

simplify(PDEtools:-dchange({x=u*v,y=v*t,z=t*u},Q,[u,v,t]));

$\frac{1}{2} \left( {\frac {\partial ^{2}}{\partial {u}^{2}}}w \left( u,v,t \right) \right) {u}^{2}+\frac12 \left( {\frac {\partial ^{2}}{ \partial {v}^{2}}}w \left( u,v,t \right) \right) {v}^{2}+\frac12 {t}^{2} {\frac {\partial ^{2}}{\partial {t}^{2}}}w \left( u,v,t \right) $

  • 0
    In this day and age, resorting to a computer algebra system _is_ a sensible way to tackle something like this.2012-07-01