rDiggleGratton: Perfect Simulation of the Diggle-Gratton Process

If nsim = 1, a point pattern (object of class "ppp"). If nsim > 1, a list of point patterns.

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 $delta <= rho$.<="" p="">

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.