In mathematics, the Laplace–Carson transform, named after Pierre Simon Laplace and John Renshaw Carson, is an integral transform with significant applications in the field of physics and engineering, particularly in the field of railway engineering.
Let
V(j,t)
p
V\ast(j,p)=
| infty | |
| p\int | |
| 0 |
V(j,t)e-ptdt
The inverse Laplace–Carson transform is:
V(j,t)=
| 1 | |
| 2\pii |
| a0+iinfty | |
| \int | |
| a0-iinfty |
etp
| V\ast(j,p) | |
| p |
dp
a0
iinfty
etp
| V(j,t) | |
| p |