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spatstat (version 1.48-0)

cauchy.estpcf: Fit the Neyman-Scott cluster process with Cauchy kernel

Description

Fits the Neyman-Scott Cluster point process with Cauchy kernel to a point pattern dataset by the Method of Minimum Contrast, using the pair correlation function.

Usage

cauchy.estpcf(X, startpar=c(kappa=1,scale=1), lambda=NULL, q = 1/4, p = 2, rmin = NULL, rmax = NULL, ..., pcfargs = list())

Arguments

X
Data to which the model will be fitted. Either a point pattern or a summary statistic. See Details.
startpar
Vector of starting values for the parameters of the model.
lambda
Optional. An estimate of the intensity of the point process.
q,p
Optional. Exponents for the contrast criterion.
rmin, rmax
Optional. The interval of $r$ values for the contrast criterion.
...
Optional arguments passed to optim to control the optimisation algorithm. See Details.
pcfargs
Optional list containing arguments passed to pcf.ppp to control the smoothing in the estimation of the pair correlation function.

Value

An object of class "minconfit". There are methods for printing and plotting this object. It contains the following main components:

Details

This algorithm fits the Neyman-Scott cluster point process model with Cauchy kernel to a point pattern dataset by the Method of Minimum Contrast, using the pair correlation function.

The argument X can be either

The algorithm fits the Neyman-Scott cluster point process with Cauchy kernel to X, by finding the parameters of the Matern Cluster model which give the closest match between the theoretical pair correlation function of the Matern Cluster process and the observed pair correlation function. For a more detailed explanation of the Method of Minimum Contrast, see mincontrast. The model is described in Jalilian et al (2013). It is a cluster process formed by taking a pattern of parent points, generated according to a Poisson process with intensity $\kappa$, and around each parent point, generating a random number of offspring points, such that the number of offspring of each parent is a Poisson random variable with mean $\mu$, and the locations of the offspring points of one parent follow a common distribution described in Jalilian et al (2013).

If the argument lambda is provided, then this is used as the value of the point process intensity $\lambda$. Otherwise, if X is a point pattern, then $\lambda$ will be estimated from X. If X is a summary statistic and lambda is missing, then the intensity $\lambda$ cannot be estimated, and the parameter $\mu$ will be returned as NA.

The remaining arguments rmin,rmax,q,p control the method of minimum contrast; see mincontrast.

The corresponding model can be simulated using rCauchy. For computational reasons, the optimisation procedure internally uses the parameter eta2, which is equivalent to 4 * scale^2 where scale is the scale parameter for the model as used in rCauchy. Homogeneous or inhomogeneous Neyman-Scott/Cauchy models can also be fitted using the function kppm and the fitted models can be simulated using simulate.kppm.

The optimisation algorithm can be controlled through the additional arguments "..." which are passed to the optimisation function optim. For example, to constrain the parameter values to a certain range, use the argument method="L-BFGS-B" to select an optimisation algorithm that respects box constraints, and use the arguments lower and upper to specify (vectors of) minimum and maximum values for each parameter.

References

Ghorbani, M. (2012) Cauchy cluster process. Metrika, to appear.

Jalilian, A., Guan, Y. and Waagepetersen, R. (2013) Decomposition of variance for spatial Cox processes. Scandinavian Journal of Statistics 40, 119-137.

Waagepetersen, R. (2007) An estimating function approach to inference for inhomogeneous Neyman-Scott processes. Biometrics 63, 252--258.

See Also

kppm, cauchy.estK, lgcp.estpcf, thomas.estpcf, vargamma.estpcf, mincontrast, pcf, pcfmodel.

rCauchy to simulate the model.

Examples

Run this code
    u <- cauchy.estpcf(redwood)
    u
    plot(u, legendpos="topright")

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