Finding the Scalar Potential Function for an Irrotational Vector Field
If a vector field
has zero curl everywhere, so that
at every point, then
for some function
called the scalar potential.
Givenwe can find
at least to an additive constant, by forming and solving differential equations.
Example:
Hence a scalar function f exists so that
Then
Integrating the first of these gives
Integrating the second of these gives
Integrating the third of these gives
and
are arbitrary functions and since
is a functions of
only,
is a function of
only andis a function of
only,andare constant functions.
Hence