Gres: Residual G Function
In spatstat.model: Parametric Statistical Modelling and Inference for the 'spatstat' Family
Gres R Documentation
Residual G Function
Description
Given a point process model fitted to a point pattern dataset,
this function computes the residual G function,
which serves as a diagnostic for goodness-of-fit of the model.
Usage
Gres(object, ...)
Arguments
object
Object to be analysed.
Either a fitted point process model (object of class "ppm"),
a point pattern (object of class "ppp"),
a quadrature scheme (object of class "quad"),
or the value returned by a previous call to Gcom.
...
Arguments passed to Gcom.
Details
This command provides a diagnostic for the goodness-of-fit of
a point process model fitted to a point pattern dataset.
It computes a residual version of the G function of the
dataset, which should be approximately zero if the model is a good
fit to the data.
In normal use, object is a fitted point process model
or a point pattern. Then Gres first calls Gcom
to compute both the nonparametric estimate of the G function
and its model compensator. Then Gres computes the
difference between them, which is the residual G-function.
Alternatively, object may be a function value table
(object of class "fv") that was returned by
a previous call to Gcom. Then Gres computes the
residual from this object.
Value
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.
Author(s)
\adrian,
\ege and Jesper \Moller.
References
Baddeley, A., Rubak, E. and \Moller, J. (2011)
Score, pseudo-score and residual
diagnostics for spatial point process models.
Statistical Science 26, 613–646.
See Also
Related functions:
Gcom,
Gest.
Alternative functions:
Kres,
psstA,
psstG,
psst.
Model-fitting:
ppm.
Examples
fit0 <- ppm(cells, ~1) # uniform Poisson
G0 <- Gres(fit0)
plot(G0)
# Hanisch correction estimate
plot(G0, hres ~ r)
# uniform Poisson is clearly not correct
fit1 <- ppm(cells, ~1, Strauss(0.08))
plot(Gres(fit1), hres ~ r)
# fit looks approximately OK; try adjusting interaction distance
plot(Gres(cells, interaction=Strauss(0.12)))
# How to make envelopes
if(interactive()) {
E <- envelope(fit1, Gres, model=fit1, nsim=39)
plot(E)
}
# For computational efficiency
Gc <- Gcom(fit1)
G1 <- Gres(Gc)
spatstat.model documentation built on Sept. 30, 2024, 9:26 a.m.
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| Gres | R Documentation |
Residual G Function
Description
Given a point process model fitted to a point pattern dataset,
this function computes the residual G function,
which serves as a diagnostic for goodness-of-fit of the model.
Usage
Gres(object, ...)
Arguments
object |
Object to be analysed.
Either a fitted point process model (object of class |
... |
Arguments passed to |
Details
This command provides a diagnostic for the goodness-of-fit of
a point process model fitted to a point pattern dataset.
It computes a residual version of the G function of the
dataset, which should be approximately zero if the model is a good
fit to the data.
In normal use, object is a fitted point process model
or a point pattern. Then Gres first calls Gcom
to compute both the nonparametric estimate of the G function
and its model compensator. Then Gres computes the
difference between them, which is the residual G-function.
Alternatively, object may be a function value table
(object of class "fv") that was returned by
a previous call to Gcom. Then Gres computes the
residual from this object.
Value
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.
Author(s)
\adrian, \ege and Jesper \Moller.
References
Baddeley, A., Rubak, E. and \Moller, J. (2011) Score, pseudo-score and residual diagnostics for spatial point process models. Statistical Science 26, 613–646.
See Also
Related functions:
Gcom,
Gest.
Alternative functions:
Kres,
psstA,
psstG,
psst.
Model-fitting:
ppm.
Examples
fit0 <- ppm(cells, ~1) # uniform Poisson
G0 <- Gres(fit0)
plot(G0)
# Hanisch correction estimate
plot(G0, hres ~ r)
# uniform Poisson is clearly not correct
fit1 <- ppm(cells, ~1, Strauss(0.08))
plot(Gres(fit1), hres ~ r)
# fit looks approximately OK; try adjusting interaction distance
plot(Gres(cells, interaction=Strauss(0.12)))
# How to make envelopes
if(interactive()) {
E <- envelope(fit1, Gres, model=fit1, nsim=39)
plot(E)
}
# For computational efficiency
Gc <- Gcom(fit1)
G1 <- Gres(Gc)
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