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spatstat.explore (version 3.2-3)

localKcross: Local Multitype K Function (Cross-Type)

Description

for a multitype point pattern, computes the cross-type version of the local K function.

Usage

localKcross(X, from, to, ..., rmax = NULL,
              correction = "Ripley", verbose = TRUE, rvalue=NULL)
  localLcross(X, from, to, ..., rmax = NULL, correction = "Ripley")

Value

If rvalue is given, the result is a numeric vector of length equal to the number of points in the point pattern that belong to type from.

If rvalue is absent, the result is an object of class "fv", see fv.object, which can be plotted directly using plot.fv. Essentially a data frame containing columns

r

the vector of values of the argument \(r\) at which the function \(K\) has been estimated

theo

the theoretical value \(K(r) = \pi r^2\) or \(L(r)=r\) for a stationary Poisson process

together with columns containing the values of the neighbourhood density function for each point in the pattern. Column i corresponds to the ith point of type from. The last two columns contain the r and theo values.

Arguments

X

A multitype point pattern (object of class "ppp" with marks which are a factor).

...

Further arguments passed from localLcross to localKcross.

rmax

Optional. Maximum desired value of the argument \(r\).

from

Type of points from which distances should be measured. A single value; one of the possible levels of marks(X), or an integer indicating which level.

to

Type of points to which distances should be measured. A single value; one of the possible levels of marks(X), or an integer indicating which level.

correction

String specifying the edge correction to be applied. Options are "none", "translate", "translation", "Ripley", "isotropic" or "best". Only one correction may be specified.

verbose

Logical flag indicating whether to print progress reports during the calculation.

rvalue

Optional. A single value of the distance argument \(r\) at which the function L or K should be computed.

Author

Ege Rubak rubak@math.aau.dk and Adrian Baddeley Adrian.Baddeley@curtin.edu.au.

Details

Given a multitype spatial point pattern X, the local cross-type \(K\) function localKcross is the local version of the multitype \(K\) function Kcross. Recall that Kcross(X, from, to) is a sum of contributions from all pairs of points in X where the first point belongs to from and the second point belongs to type to. The local cross-type \(K\) function is defined for each point X[i] that belongs to type from, and it consists of all the contributions to the cross-type \(K\) function that originate from point X[i]: $$ K_{i,from,to}(r) = \sqrt{\frac a {(n-1) \pi} \sum_j e_{ij}} $$ where the sum is over all points \(j \neq i\) belonging to type to, that lie within a distance \(r\) of the \(i\)th point, \(a\) is the area of the observation window, \(n\) is the number of points in X, and \(e_{ij}\) is an edge correction term (as described in Kest). The value of \(K_{i,from,to}(r)\) can also be interpreted as one of the summands that contributes to the global estimate of the Kcross function.

By default, the function \(K_{i,from,to}(r)\) is computed for a range of \(r\) values for each point \(i\) belonging to type from. The results are stored as a function value table (object of class "fv") with a column of the table containing the function estimates for each point of the pattern X belonging to type from.

Alternatively, if the argument rvalue is given, and it is a single number, then the function will only be computed for this value of \(r\), and the results will be returned as a numeric vector, with one entry of the vector for each point of the pattern X belonging to type from.

The local cross-type \(L\) function localLcross is computed by applying the transformation \(L(r) = \sqrt{K(r)/(2\pi)}\).

See Also

Kcross, Lcross, localK, localL.

Inhomogeneous counterparts of localK and localL are computed by localKcross.inhom and localLinhom.

Examples

Run this code
  X <- amacrine

  # compute all the local Lcross functions
  L <- localLcross(X)

  # plot all the local Lcross functions against r
  plot(L, main="local Lcross functions for amacrine", legend=FALSE)

  # plot only the local L function for point number 7
  plot(L, iso007 ~ r)
  
  # compute the values of L(r) for r = 0.1 metres
  L12 <- localLcross(X, rvalue=0.1)

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