# diagnose.ppm

##### Diagnostic Plots for Fitted Point Process Model

Given a point process model fitted to a point pattern, produce diagnostic plots based on residuals.

##### Usage

```
diagnose.ppm(object, …, type="raw", which="all", sigma=NULL,
rbord=reach(object), cumulative=TRUE,
plot.it=TRUE, rv = NULL,
compute.sd=is.poisson(object), compute.cts=TRUE,
envelope=FALSE, nsim=39, nrank=1,
typename, check=TRUE, repair=TRUE,
oldstyle=FALSE, splineargs=list(spar=0.5))
``` # S3 method for diagppm
plot(x, …, which,
plot.neg=c("image", "discrete", "contour", "imagecontour"),
plot.smooth=c("imagecontour", "image", "contour", "persp"),
plot.sd, spacing=0.1, outer=3,
srange=NULL, monochrome=FALSE, main=NULL)

##### Arguments

- object
The fitted point process model (an object of class

`"ppm"`

) for which diagnostics should be produced. This object is usually obtained from`ppm`

.- type
String indicating the type of residuals or weights to be used. Current options are

`"eem"`

for the Stoyan-Grabarnik exponential energy weights,`"raw"`

for the raw residuals,`"inverse"`

for the inverse-lambda residuals, and`"pearson"`

for the Pearson residuals. A partial match is adequate.- which
Character string or vector indicating the choice(s) of plots to be generated. Options are

`"all"`

,`"marks"`

,`"smooth"`

,`"x"`

,`"y"`

and`"sum"`

. Multiple choices may be given but must be matched exactly. See Details.- sigma
Bandwidth for kernel smoother in

`"smooth"`

option.- rbord
Width of border to avoid edge effects. The diagnostic calculations will be confined to those points of the data pattern which are at least

`rbord`

units away from the edge of the window. (An infinite value of`rbord`

will be ignored.)- cumulative
Logical flag indicating whether the lurking variable plots for the \(x\) and \(y\) coordinates will be the plots of cumulative sums of marks (

`cumulative=TRUE`

) or the plots of marginal integrals of the smoothed residual field (`cumulative=FALSE`

).- plot.it
Logical value indicating whether plots should be shown. If

`plot.it=FALSE`

, the computed diagnostic quantities are returned without plotting them.- plot.neg
String indicating how the density part of the residual measure should be plotted.

- plot.smooth
String indicating how the smoothed residual field should be plotted.

- compute.sd,plot.sd
Logical values indicating whether error bounds should be computed and added to the

`"x"`

and`"y"`

plots. The default is`TRUE`

for Poisson models and`FALSE`

for non-Poisson models. See Details.- envelope,nsim,nrank
Arguments passed to

`lurking`

in order to plot simulation envelopes for the lurking variable plots.- rv
Usually absent. Advanced use only. If this argument is present, the values of the residuals will not be calculated from the fitted model

`object`

but will instead be taken directly from`rv`

.- spacing
The spacing between plot panels (when a four-panel plot is generated) expressed as a fraction of the width of the window of the point pattern.

- outer
The distance from the outermost line of text to the nearest plot panel, expressed as a multiple of the spacing between plot panels.

- srange
Vector of length 2 that will be taken as giving the range of values of the smoothed residual field, when generating an image plot of this field. This is useful if you want to generate diagnostic plots for two different fitted models using the same colour map.

- monochrome
Flag indicating whether images should be displayed in greyscale (suitable for publication) or in colour (suitable for the screen). The default is to display in colour.

- check
Logical value indicating whether to check the internal format of

`object`

. If there is any possibility that this object has been restored from a dump file, or has otherwise lost track of the environment where it was originally computed, set`check=TRUE`

.- repair
Logical value indicating whether to repair the internal format of

`object`

, if it is found to be damaged.- oldstyle
Logical flag indicating whether error bounds should be plotted using the approximation given in the original paper (

`oldstyle=TRUE`

), or using the correct asymptotic formula (`oldstyle=FALSE`

).- splineargs
Argument passed to

`lurking`

to control the smoothing in the lurking variable plot.- x
The value returned from a previous call to

`diagnose.ppm`

. An object of class`"diagppm"`

.- typename
String to be used as the name of the residuals.

- main
Main title for the plot.

- …
Extra arguments, controlling either the resolution of the smoothed image (passed from

`diagnose.ppm`

to`density.ppp`

) or the appearance of the plots (passed from`diagnose.ppm`

to`plot.diagppm`

and from`plot.diagppm`

to`plot.default`

).- compute.cts
Advanced use only.

##### Details

The function `diagnose.ppm`

generates several diagnostic plots for a
fitted point process model.
The plots display the residuals from the fitted model
(Baddeley et al, 2005)
or alternatively the `exponential energy marks' (Stoyan and Grabarnik, 1991).
These plots can be used to
assess goodness-of-fit, to identify outliers in the data,
and to reveal departures from the fitted model.
See also the companion function `qqplot.ppm`

.

The argument `object`

must be a fitted point process model
(object of class `"ppm"`

) typically produced by the maximum
pseudolikelihood fitting algorithm `ppm`

).

The argument `type`

selects the type of residual or weight
that will be computed. Current options are:

`"eem"`

:exponential energy marks (Stoyan and Grabarnik, 1991) computed by

`eem`

. These are positive weights attached to the data points (i.e. the points of the point pattern dataset to which the model was fitted). If the fitted model is correct, then the sum of these weights for all data points in a spatial region \(B\) has expected value equal to the area of \(B\). See`eem`

for further explanation.`"raw"`

,`"inverse"`

or`"pearson"`

:point process residuals (Baddeley et al, 2005) computed by the function

`residuals.ppm`

. These are residuals attached both to the data points and to some other points in the window of observation (namely, to the dummy points of the quadrature scheme used to fit the model). If the fitted model is correct, then the sum of the residuals in a spatial region \(B\) has mean zero. The options are`"raw"`

: the raw residuals;`"inverse"`

: the `inverse-lambda' residuals, a counterpart of the exponential energy weights;`"pearson"`

: the Pearson residuals.

`residuals.ppm`

for further explanation.

The argument `which`

selects the type of plot that is
produced. Options are:

`"marks"`

:plot the residual measure. For the exponential energy weights (

`type="eem"`

) this displays circles centred at the points of the data pattern, with radii proportional to the exponential energy weights. For the residuals (`type="raw"`

,`type="inverse"`

or`type="pearson"`

) this again displays circles centred at the points of the data pattern with radii proportional to the (positive) residuals, while the plotting of the negative residuals depends on the argument`plot.neg`

. If`plot.neg="image"`

then the negative part of the residual measure, which is a density, is plotted as a colour image. If`plot.neg="discrete"`

then the discretised negative residuals (obtained by approximately integrating the negative density using the quadrature scheme of the fitted model) are plotted as squares centred at the dummy points with side lengths proportional to the (negative) residuals. [To control the size of the circles and squares, use the argument`maxsize`

.]`"smooth"`

:plot a kernel-smoothed version of the residual measure. Each data or dummy point is taken to have a `mass' equal to its residual or exponential energy weight. (Note that residuals can be negative). This point mass is then replaced by a bivariate isotropic Gaussian density with standard deviation

`sigma`

. The value of the smoothed residual field at any point in the window is the sum of these weighted densities. If the fitted model is correct, this smoothed field should be flat, and its height should be close to 0 (for the residuals) or 1 (for the exponential energy weights). The field is plotted either as an image, contour plot or perspective view of a surface, according to the argument`plot.smooth`

. The range of values of the smoothed field is printed if the option`which="sum"`

is also selected.`"x"`

:produce a `lurking variable' plot for the \(x\) coordinate. This is a plot of \(h(x)\) against \(x\) (solid lines) and of \(E(h(x))\) against \(x\) (dashed lines), where \(h(x)\) is defined below, and \(E(h(x))\) denotes the expectation of \(h(x)\) assuming the fitted model is true.

if

`cumulative=TRUE`

then \(h(x)\) is the cumulative sum of the weights or residuals for all points which have \(X\) coordinate less than or equal to \(x\). For the residuals \(E(h(x)) = 0\), and for the exponential energy weights \(E(h(x)) = \) area of the subset of the window to the left of the line \(X=x\).if

`cumulative=FALSE`

then \(h(x)\) is the marginal integral of the smoothed residual field (see the case`which="smooth"`

described above) on the \(x\) axis. This is approximately the derivative of the plot for`cumulative=TRUE`

. The value of \(h(x)\) is computed by summing the values of the smoothed residual field over all pixels with the given \(x\) coordinate. For the residuals \(E(h(x)) = 0\), and for the exponential energy weights \(E(h(x)) = \) length of the intersection between the observation window and the line \(X=x\).

`plot.sd = TRUE`

, then superimposed on the lurking variable plot are the pointwise two-standard-deviation error limits for \(h(x)\) calculated for the inhomogeneous Poisson process. The default is`plot.sd = TRUE`

for Poisson models and`plot.sd = FALSE`

for non-Poisson models.`"y"`

:produce a similar lurking variable plot for the \(y\) coordinate.

`"sum"`

:print the sum of the weights or residuals for all points in the window (clipped by a margin

`rbord`

if required) and the area of the same window. If the fitted model is correct the sum of the exponential energy weights should equal the area of the window, while the sum of the residuals should equal zero. Also print the range of values of the smoothed field displayed in the`"smooth"`

case.`"all"`

:All four of the diagnostic plots listed above are plotted together in a two-by-two display. Top left panel is

`"marks"`

plot. Bottom right panel is`"smooth"`

plot. Bottom left panel is`"x"`

plot. Top right panel is`"y"`

plot, rotated 90 degrees.

The argument `rbord`

ensures there are no edge
effects in the computation of the residuals. The diagnostic calculations
will be confined to those points of the data pattern which are
at least `rbord`

units away from the edge of the window.
The value of `rbord`

should be greater than or equal to
the range of interaction permitted in the model.

By default, the two-standard-deviation limits are calculated
from the exact formula for the asymptotic variance
of the residuals under the asymptotic normal approximation,
equation (37) of Baddeley et al (2006).
However, for compatibility with the original paper
of Baddeley et al (2005), if `oldstyle=TRUE`

,
the two-standard-deviation limits are calculated
using the innovation variance, an over-estimate of the true
variance of the residuals. (However, see the section about
Replicated Data).

The argument `rv`

would normally be used only by experts.
It enables the user to substitute arbitrary values for the
residuals or marks, overriding the usual calculations.
If `rv`

is present, then instead of calculating the residuals from
the fitted model, the algorithm takes the residuals from the object
`rv`

, and plots them in the manner appropriate to the type of residual
or mark selected by `type`

. If `type ="eem"`

then
`rv`

should be similar to the return value of `eem`

,
namely, a numeric vector of length equal to
the number of points in the original data point pattern.
Otherwise, `rv`

should be similar to the return value of
`residuals.ppm`

, that is, it should be an object of
class `"msr"`

(see `msr`

) representing a signed
measure.

The return value of `diagnose.ppm`

is an object of class `"diagppm"`

.
The `plot`

method for this class is documented here.
There is also a `print`

method. See the Examples.

In `plot.diagppm`

,
if a four-panel diagnostic plot is produced (the default), then
the extra arguments `xlab`

, `ylab`

, `rlab`

determine the
text labels for the \(x\) and \(y\) coordinates
and the residuals, respectively.
The undocumented arguments `col.neg`

and `col.smooth`

control the colour maps used in the top left and bottom right
panels respectively.

See also the companion functions `qqplot.ppm`

, which produces a
Q-Q plot of the residuals, and `lurking`

, which produces
lurking variable plots for any spatial covariate.

##### Value

An object of class `"diagppm"`

which contains
the coordinates needed to reproduce the selected plots.
This object can be plotted using `plot.diagppm`

and printed using `print.diagppm`

.

##### Replicated Data

Note that if `object`

is a model that was obtained by
first fitting a model to replicated point pattern data using
`mppm`

and then using `subfits`

to extract
a model for one of the individual point patterns, then the
variance calculations are only implemented for the
innovation variance (`oldstyle=TRUE`

) and this is the default
in such cases.

##### References

Baddeley, A., Turner, R., Moller, J. and Hazelton, M. (2005)
Residual analysis for spatial point processes.
*Journal of the Royal Statistical Society, Series B*
**67**, 617--666.

Baddeley, A., Moller, J. and Pakes, A.G. (2008)
Properties of residuals for spatial point processes.
*Annals of the Institute of Statistical Mathematics*
**60**, 627--649.

Stoyan, D. and Grabarnik, P. (1991)
Second-order characteristics for stochastic structures connected with
Gibbs point processes.
*Mathematische Nachrichten*, 151:95--100.

##### See Also

##### Examples

```
# NOT RUN {
fit <- ppm(cells ~x, Strauss(r=0.15))
diagnose.ppm(fit)
# }
# NOT RUN {
diagnose.ppm(fit, type="pearson")
# }
# NOT RUN {
diagnose.ppm(fit, which="marks")
diagnose.ppm(fit, type="raw", plot.neg="discrete")
diagnose.ppm(fit, type="pearson", which="smooth")
# save the diagnostics and plot them later
u <- diagnose.ppm(fit, rbord=0.15, plot.it=FALSE)
# }
# NOT RUN {
plot(u)
plot(u, which="marks")
# }
```

*Documentation reproduced from package spatstat, version 1.52-1, License: GPL (>= 2)*