The SPP Procedure

Inhomogeneous Poisson Process Model Fitting

Subsections:

Likelihood Methods for Model Fitting
Fit Statistics
Fitted Model Validation That Uses Goodness-of-Fit Tests
Fitted Model Validation That Uses Residuals

An inhomogeneous Poisson process that has intensity function $\lambda (s)$ is a point process in which the number of points that fall in a spatial region W, $N(X\cap W)$ has the following expectation:

$\mathbb {E}[N(X\cap W)] = \int _ W \lambda (s) ds$

Also, the $N(X\cap W)$ points are independent and identically distributed for disjoint subsets W with a probability density of

$f(s) = \frac{\lambda (s)}{\int _ W \lambda (s)ds}$

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