DiggleGratton: Diggle-Gratton model

An object of class "interact" describing the interpoint interaction structure of a point process.

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) and Diggle, Gates and Stibbard (1987) 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 potential is inhibitory, i.e.\ this model is only appropriate for regular point patterns. The strength of inhibition increases with \(\kappa\). For \(\kappa=0\) the model is a hard core process with hard core radius \(\delta\). For \(\kappa=\infty\) the model is a hard core process with hard core radius \(\rho\).

The irregular parameters \(\delta, \rho\) must be given in the call to DiggleGratton, while the regular parameter \(\kappa\) will be estimated.

If the lower threshold delta is missing or NA, it will be estimated from the data when ppm is called. The estimated value of delta is the minimum nearest neighbour distance multiplied by \(n/(n+1)\), where \(n\) is the number of data points.