Geyer: Geyer's Saturation Point Process Model

• An object of class "interact" describing the interpoint interaction structure of Geyer's ``saturation point process'' with interaction radius $r$ and saturation threshold sat.

The saturation point process with interaction radius $r$, saturation threshold $s$, and parameters $\beta$ and $\gamma$, is the point process in which each point $x_i$ in the pattern $X$ contributes a factor $$\beta \gamma^{\min(s, t(x_i, X))}$$ to the probability density of the point pattern, where $t(x_i, X)$ denotes the number of ``close neighbours'' of $x_i$ in the pattern $X$. A close neighbour of $x_i$ is a point $x_j$ with $j \neq i$ such that the distance between $x_i$ and $x_j$ is less than or equal to $r$.

If the saturation threshold $s$ is set to infinity, this model reduces to the Strauss process (see Strauss) with interaction parameter $\gamma^2$. If $s = 0$, the model reduces to the Poisson point process. If $s$ is a finite positive number, then the interaction parameter $\gamma$ may take any positive value (unlike the case of the Strauss process), with values $\gamma < 1$ describing an ``ordered'' or ``inhibitive'' pattern, and values $\gamma > 1$ describing a ``clustered or ``attractive'' pattern. The nonstationary saturation process is similar except that the value $\beta$ is replaced by a function $\beta(x_i)$ of location. The function ppm(), which fits point process models to point pattern data, requires an argument of class "interact" describing the interpoint interaction structure of the model to be fitted. The appropriate description of the saturation process interaction is yielded by Geyer(r, sat) where the arguments r and sat specify the Strauss interaction radius $r$ and the saturation threshold $s$, respectively. See the examples below. Note the only arguments are the interaction radius r and the saturation threshold sat. When r and sat are fixed, the model becomes an exponential family. The canonical parameters $\log(\beta)$ and $\log(\gamma)$ are estimated by ppm(), not fixed in Geyer().