Generate a random pattern of points, a simulated realisation of the Diggle-Gratton process, using a perfect simulation algorithm.
rDiggleGratton(beta, delta, rho, kappa=1, W = owin(),
expand=TRUE, nsim=1, drop=TRUE)
intensity parameter (a positive number).
hard core distance (a non-negative number).
interaction range (a number greater than delta
).
interaction exponent (a non-negative number).
window (object of class "owin"
) in which to
generate the random pattern. Currently this must be a rectangular
window.
Logical. If FALSE
, simulation is performed
in the window W
, which must be rectangular.
If TRUE
(the default), simulation is performed
on a larger window, and the result is clipped to the original
window W
.
Alternatively expand
can be an object of class
"rmhexpand"
(see rmhexpand
)
determining the expansion method.
Number of simulated realisations to be generated.
Logical. If nsim=1
and drop=TRUE
(the default), the
result will be a point pattern, rather than a list
containing a point pattern.
If nsim = 1
, a point pattern (object of class "ppp"
).
If nsim > 1
, a list of point patterns.
This function generates a realisation of the
Diggle-Gratton point process in the window W
using a ‘perfect simulation’ algorithm.
Diggle and Gratton (1984, pages 208-210) introduced the pairwise interaction point process with pair potential \(h(t)\) of the form $$ h(t) = \left( \frac{t-\delta}{\rho-\delta} \right)^\kappa \quad\quad \mbox{ if } \delta \le t \le \rho $$ with \(h(t) = 0\) for \(t < \delta\) and \(h(t) = 1\) for \(t > \rho\). Here \(\delta\), \(\rho\) and \(\kappa\) are parameters.
Note that we use the symbol \(\kappa\) where Diggle and Gratton (1984) use \(\beta\), since in spatstat we reserve the symbol \(\beta\) for an intensity parameter.
The parameters must all be nonnegative, and must satisfy \(\delta \le \rho\).
The simulation algorithm used to generate the point pattern
is ‘dominated coupling from the past’
as implemented by Berthelsen and Moller (2002, 2003).
This is a ‘perfect simulation’ or ‘exact simulation’
algorithm, so called because the output of the algorithm is guaranteed
to have the correct probability distribution exactly (unlike the
Metropolis-Hastings algorithm used in rmh
, whose output
is only approximately correct).
There is a tiny chance that the algorithm will run out of space before it has terminated. If this occurs, an error message will be generated.
Berthelsen, K.K. and Moller, J. (2002) A primer on perfect simulation for spatial point processes. Bulletin of the Brazilian Mathematical Society 33, 351-367.
Berthelsen, K.K. and Moller, J. (2003) Likelihood and non-parametric Bayesian MCMC inference for spatial point processes based on perfect simulation and path sampling. Scandinavian Journal of Statistics 30, 549-564.
Diggle, P.J. and Gratton, R.J. (1984) Monte Carlo methods of inference for implicit statistical models. Journal of the Royal Statistical Society, series B 46, 193 -- 212.
Moller, J. and Waagepetersen, R. (2003). Statistical Inference and Simulation for Spatial Point Processes. Chapman and Hall/CRC.
# NOT RUN {
X <- rDiggleGratton(50, 0.02, 0.07)
Z <- rDiggleGratton(50, 0.02, 0.07, 2, nsim=2)
# }
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