Gcom: Model Compensator of Nearest Neighbour Function

A function value table (object of class "fv"), essentially a data frame of function values. There is a plot method for this class. See fv.object.

This command provides a diagnostic for the goodness-of-fit of a point process model fitted to a point pattern dataset. It computes different estimates of the nearest neighbour distance distribution function $G$ of the dataset, which should be approximately equal if the model is a good fit to the data.

The first argument, object, is usually a fitted point process model (object of class "ppm"), obtained from the model-fitting function ppm.

For convenience, object can also be a point pattern (object of class "ppp"). In that case, a point process model will be fitted to it, by calling ppm using the arguments trend (for the first order trend), interaction (for the interpoint interaction) and rbord (for the erosion distance in the border correction for the pseudolikelihood). See ppm for details of these arguments.

The algorithm first extracts the original point pattern dataset (to which the model was fitted) and computes the standard nonparametric estimates of the $G$ function. It then also computes the model-compensated $G$ function. The different functions are returned as columns in a data frame (of class "fv"). The interpretation of the columns is as follows (ignoring edge corrections):

bord:

the nonparametric border-correction estimate of $G(r)$, $$\hat{G}(r)=\frac{\sum _{i}I\{d_i\le r\}I\{b_i>r\}}{\sum _{i}I\{b_i>r\}}$$ where $d_i$ is the distance from the $i$-th data point to its nearest neighbour, and $b_i$ is the distance from the $i$-th data point to the boundary of the window $W$.

bcom:

the model compensator of the border-correction estimate $$\mathbf{C}\hat{G}(r)=\frac{\int \lambda (u,x)I\{b(u)>r\}I\{d(u,x)\le r\}}{1+\sum _{i}I\{b_i>r\}}$$ where $\lambda (u,x)$ denotes the conditional intensity of the model at the location $u$, and $d(u,x)$ denotes the distance from $u$ to the nearest point in $x$, while $b(u)$ denotes the distance from $u$ to the boundary of the window$W$.

han:

the nonparametric Hanisch estimate of $G(r)$ $$\hat{G}(r)=\frac{D(r)}{D(\mathrm{\infty })}$$ where $$D(r)=\sum _i\frac{I\{x_i\in W_{\ominus d_i}\}I\{d_i\le r\}}{\text{area}(W_{\ominus d_i})}$$ in which $W_{\ominus r}$ denotes the erosion of the window $W$ by a distance $r$.

hcom:

the corresponding model-compensated function $$\mathbf{C}G(r)={\int }_W\frac{\lambda (u,x)I(u\in W_{\ominus d(u)})I(d(u)\le r)}{\hat{D}(\mathrm{\infty })\text{area}(W_{\ominus d(u)})+1}$$ where $d(u)=d(u,x)$ is the (`empty space') distance from location $u$ to the nearest point of $x$.

If the fitted model is a Poisson point process, then the formulae above are exactly what is computed. If the fitted model is not Poisson, the formulae above are modified slightly to handle edge effects.

The modification is determined by the arguments conditional and restrict. The value of conditional defaults to FALSE for Poisson models and TRUE for non-Poisson models. If conditional=FALSE then the formulae above are not modified. If conditional=TRUE, then the algorithm calculates the restriction estimator if restrict=TRUE, and calculates the reweighting estimator if restrict=FALSE. See Appendix E of Baddeley, Rubak and Moller (2011). See also spatstat.options('eroded.intensity'). Thus, by default, the reweighting estimator is computed for non-Poisson models.

The border-corrected and Hanisch-corrected estimates of $G(r)$ are approximately unbiased estimates of the $G$-function, assuming the point process is stationary. The model-compensated functions are unbiased estimates of the mean value of the corresponding nonparametric estimate, assuming the model is true. Thus, if the model is a good fit, the mean value of the difference between the nonparametric and model-compensated estimates is approximately zero.

To compute the difference between the nonparametric and model-compensated functions, use Gres.