The set covariance function of a region $W$ in the plane
is the function $C(v)$ defined for each vector $v$
as the area of the intersection between $W$ and $W+v$,
where $W+v$ is the set obtained by shifting (translating)
$W$ by $v$. We may interpret $C(v)$ as the area of the set of
all points $x$ in $W$ such that $x+v$ also lies in
$W$.
This command computes a discretised approximation to
the set covariance function of any
plane region $W$ represented as a window object (of class
"owin", see owin.object). The return value is
a pixel image (object of class "im") whose greyscale values
are values of the set covariance function.
The set covariance is computed using the Fast Fourier Transform,
unless W is a rectangle, when an exact formula is used.