Eidos
Aug25-08, 12:38 PM
Hi all
I wanted to know if any of you know of a good physical example where you would NEED to do an inverse z/Laplace using the contour integral definition.
I know that we would resort to contour integrals when the function in the z or s plane has branch cuts.
Functions like \sqrt{z} or \ln{s} are of the sort I'm talking about.
Thanks
:smile:
I wanted to know if any of you know of a good physical example where you would NEED to do an inverse z/Laplace using the contour integral definition.
I know that we would resort to contour integrals when the function in the z or s plane has branch cuts.
Functions like \sqrt{z} or \ln{s} are of the sort I'm talking about.
Thanks
:smile: