robousy
Jul14-08, 03:17 PM
Hey folks,
I'm trying to find the Green function for the equation
-\partial_\mu \partial^\mu \phi = K
where K is some source term. Its a 2D problem with the wave confined to a rectangular cavity where the cavity is located at z = 0 and z=a.
This tells me that G|_0= G|_a=0
I've pretty much solved this problem for the case of NO boundary conditions, eg an infinte wave, I'm just stuck on where to put in info on the BC's.
I am confident I have derived the following expression correctly as it matches with a book I am using:
(-\partial_z^2-\lambda^2)g(z,z')=\delta(z-z')
where \lambda^2=\omega^2-k^2
So really this is the problem I need to solve - where g is the reduced Greens function.
I can solve this by taking the FT and using contour integrals...pretty standard, but this is for an infinite wave. My question is 'where and how do I impose boundary conditions for g(0,z')=g(a,z')=0 ??'.
I'm trying to find the Green function for the equation
-\partial_\mu \partial^\mu \phi = K
where K is some source term. Its a 2D problem with the wave confined to a rectangular cavity where the cavity is located at z = 0 and z=a.
This tells me that G|_0= G|_a=0
I've pretty much solved this problem for the case of NO boundary conditions, eg an infinte wave, I'm just stuck on where to put in info on the BC's.
I am confident I have derived the following expression correctly as it matches with a book I am using:
(-\partial_z^2-\lambda^2)g(z,z')=\delta(z-z')
where \lambda^2=\omega^2-k^2
So really this is the problem I need to solve - where g is the reduced Greens function.
I can solve this by taking the FT and using contour integrals...pretty standard, but this is for an infinite wave. My question is 'where and how do I impose boundary conditions for g(0,z')=g(a,z')=0 ??'.