The (stationary) multitype
Strauss process with \(m\) types, with interaction radii
\(r_{ij}\) and
parameters \(\beta_j\) and \(\gamma_{ij}\)
is the pairwise interaction point process
in which each point of type \(j\)
contributes a factor \(\beta_j\) to the
probability density of the point pattern, and a pair of points
of types \(i\) and \(j\) closer than \(r_{ij}\)
units apart contributes a factor
\(\gamma_{ij}\) to the density.
The nonstationary multitype Strauss process is similar except that
the contribution of each individual point \(x_i\)
is a function \(\beta(x_i)\)
of location and type, rather than a constant beta.
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 multitype
Strauss process pairwise interaction is
yielded by the function MultiStrauss(). See the examples below.
The argument types need not be specified in normal use.
It will be determined automatically from the point pattern data set
to which the MultiStrauss interaction is applied,
when the user calls ppm.
However, the user should be confident that
the ordering of types in the dataset corresponds to the ordering of
rows and columns in the matrix radii.
The matrix radii must be symmetric, with entries
which are either positive numbers or NA.
A value of NA indicates that no interaction term should be included
for this combination of types.
Note that only the interaction radii are
specified in MultiStrauss. The canonical
parameters \(\log(\beta_j)\) and
\(\log(\gamma_{ij})\) are estimated by
ppm(), not fixed in MultiStrauss().