rVarGamma(kappa, nu.ker, omega, mu, win = owin(), eps = 0.001)"owin"
or something acceptable to as.owin."ppp"). Additionally, some intermediate results of the simulation are
returned as attributes of this point pattern.
See rNeymanScott.
win. The process is constructed by first
generating a Poisson point process of ``parent'' points
with intensity kappa. Then each parent point is
replaced by a random cluster of points, the number of points in each
cluster being random with a Poisson (mu) distribution,
and the points being placed independently and uniformly
according to a Variance Gamma kernel.
In this implementation, parent points are not restricted to lie in the window; the parent process is effectively the uniform Poisson process on the infinite plane.
This model can be fitted to data by the method of minimum contrast,
using cauchy.estK, cauchy.estpcf
or kppm.
The algorithm can also generate spatially inhomogeneous versions of
the cluster process:
kappais afunction(x,y)or a pixel image (object of class"im"), then it is taken
as specifying the intensity function of an inhomogeneous Poisson
process that generates the parent points.muis afunction(x,y)or a pixel image (object of class"im"), then it is
interpreted as the reference density for offspring points,
in the sense of Waagepetersen (2006).kappa is a single number)
and the offspring are inhomogeneous (mu is a
function or pixel image), the model can be fitted to data
using kppm, or using cauchy.estK
or cauchy.estpcf
applied to the inhomogeneous $K$ function.rpoispp,
rNeymanScott,
cauchy.estK,
cauchy.estpcf,
kppm.# homogeneous
X <- rVarGamma(30, 2, 0.02, 5)
# inhomogeneous
Z <- as.im(function(x,y){ exp(2 - 3 * x) }, W= owin())
Y <- rVarGamma(30, 2, 0.02, Z)Run the code above in your browser using DataLab