pcfmulti(X, I, J, ..., r = NULL, kernel = "epanechnikov", bw = NULL, stoyan = 0.15, correction = c("translate", "Ripley"), divisor = c("r", "d"), Iname = "points satisfying condition I", Jname = "points satisfying condition J")X
from which distances are measured.
X to which
distances are measured.
density.default.
density.default.
"r" (the default) or "d".
I and J.
"fv".
pcfcross
to arbitrary collections of points. The algorithm measures the distance from each data point
in subset I to each data point in subset J,
excluding identical pairs of points. The distances are
kernel-smoothed and renormalised to form a pair correlation
function.
divisor="r" (the default), then the multitype
counterpart of the standard
kernel estimator (Stoyan and Stoyan, 1994, pages 284--285)
is used. By default, the recommendations of Stoyan and Stoyan (1994)
are followed exactly.
divisor="d" then a modified estimator is used:
the contribution from
an interpoint distance $d[ij]$ to the
estimate of $g(r)$ is divided by $d[ij]$
instead of dividing by $r$. This usually improves the
bias of the estimator when $r$ is close to zero.
There is also a choice of spatial edge corrections
(which are needed to avoid bias due to edge effects
associated with the boundary of the spatial window):
correction="translate" is the Ohser-Stoyan translation
correction, and correction="isotropic" or "Ripley"
is Ripley's isotropic correction.
The arguments I and J specify two subsets of the
point pattern X. They may be any type of subset indices, for example,
logical vectors of length equal to npoints(X),
or integer vectors with entries in the range 1 to
npoints(X), or negative integer vectors.
Alternatively, I and J may be functions
that will be applied to the point pattern X to obtain
index vectors. If I is a function, then evaluating
I(X) should yield a valid subset index. This option
is useful when generating simulation envelopes using
envelope.
The choice of smoothing kernel is controlled by the
argument kernel which is passed to density.
The default is the Epanechnikov kernel.
The bandwidth of the smoothing kernel can be controlled by the
argument bw. Its precise interpretation
is explained in the documentation for density.default.
For the Epanechnikov kernel with support $[-h,h]$,
the argument bw is equivalent to $h/sqrt(5)$.
If bw is not specified, the default bandwidth
is determined by Stoyan's rule of thumb (Stoyan and Stoyan, 1994, page
285) applied to the points of type j. That is,
$h = c/sqrt(lambda)$,
where $lambda$ is the (estimated) intensity of the
point process of type j,
and $c$ is a constant in the range from 0.1 to 0.2.
The argument stoyan determines the value of $c$.
pcfcross,
pcfdot,
pcf.ppp.
adult <- (marks(longleaf) >= 30)
juvenile <- !adult
p <- pcfmulti(longleaf, adult, juvenile)
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