linearpcfcross.inhom

0th

Percentile

Inhomogeneous Multitype Pair Correlation Function (Cross-type) for Linear Point Pattern

For a multitype point pattern on a linear network, estimate the inhomogeneous multitype pair correlation function from points of type $i$ to points of type $j$.

Keywords
spatial, nonparametric
Usage
linearpcfcross.inhom(X, i, j, lambdaI, lambdaJ, r=NULL, ...,
                     correction="Ang", normalise=TRUE)
Arguments
X
The observed point pattern, from which an estimate of the $i$-to-any pair correlation function $g_{ij}(r)$ will be computed. An object of class "lpp" which must be a multitype point pattern (a marked point pattern whose
i
Number or character string identifying the type (mark value) of the points in X from which distances are measured. Defaults to the first level of marks(X).
j
Number or character string identifying the type (mark value) of the points in X to which distances are measured. Defaults to the second level of marks(X).
lambdaI
Intensity values for the points of type i. Either a numeric vector, a function, a pixel image (object of class "im" or "linim") or a fitted point process model (object of class "ppm"
lambdaJ
Intensity values for the points of type j. Either a numeric vector, a function, a pixel image (object of class "im" or "linim") or a fitted point process model (object of class "ppm"
r
numeric vector. The values of the argument $r$ at which the function $g_{ij}(r)$ should be evaluated. There is a sensible default. First-time users are strongly advised not to specify this argument. See below for important conditions o
correction
Geometry correction. Either "none" or "Ang". See Details.
...
Arguments passed to density.default to control the kernel smoothing.
normalise
Logical. If TRUE (the default), the denominator of the estimator is data-dependent (equal to the sum of the reciprocal intensities at the points of type i), which reduces the sampling variability. If FALSE
Details

This is a counterpart of the function pcfcross.inhom for a point pattern on a linear network (object of class "lpp").

The argument i will be interpreted as levels of the factor marks(X). If i is missing, it defaults to the first level of the marks factor.

The argument r is the vector of values for the distance $r$ at which $g_{ij}(r)$ should be evaluated. The values of $r$ must be increasing nonnegative numbers and the maximum $r$ value must not exceed the radius of the largest disc contained in the window.

Value

Warnings

The argument i is interpreted as a level of the factor marks(X). Beware of the usual trap with factors: numerical values are not interpreted in the same way as character values.

References

Baddeley, A, Jammalamadaka, A. and Nair, G. (to appear) Multitype point process analysis of spines on the dendrite network of a neuron. Applied Statistics (Journal of the Royal Statistical Society, Series C), In press.

See Also

linearpcfdot, linearpcf, pcfcross.inhom.

Aliases
  • linearpcfcross.inhom
Examples
lam <- table(marks(chicago))/(summary(chicago)$totlength)
   lamI <- function(x,y,const=lam[["assault"]]){ rep(const, length(x)) }
   lamJ <- function(x,y,const=lam[["robbery"]]){ rep(const, length(x)) }

   g <- linearpcfcross.inhom(chicago, "assault", "robbery", lamI, lamJ)

   fit <- lppm(chicago, ~marks + x)
     linearpcfcross.inhom(chicago, "assault", "robbery", fit, fit)
Documentation reproduced from package spatstat, version 1.36-0, License: GPL (>= 2)

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