Simple point process

A simple point process is a special type of point process in probability theory. In simple point processes, every point is assigned the weight one.

Let ${\displaystyle S}$ be a locally compact second countable Hausdorff space and let ${\displaystyle 𝒮}$ be its Borel ${\displaystyle \sigma }$-algebra. A point process ${\displaystyle \xi }$, interpreted as random measure on ${\displaystyle (S,𝒮)}$, is called a simple point process if it can be written as

${\displaystyle \xi =\sum _{i\in I}{\delta }_{X_i}}$

for an index set ${\displaystyle I}$ and random elements ${\displaystyle X_i}$ which are almost everywhere pairwise distinct. Here ${\displaystyle {\delta }_x}$ denotes the Dirac measure on the point ${\displaystyle x}$.

Simple point processes include many important classes of point processes such as Poisson processes, Cox processes and binomial processes.

If ${\displaystyle ℐ}$ is a generating ring of ${\displaystyle 𝒮}$ then a simple point process ${\displaystyle \xi }$ is uniquely determined by its values on the sets ${\displaystyle U\in ℐ}$. This means that two simple point processes ${\displaystyle \xi }$ and ${\displaystyle \zeta }$ have the same distributions iff

${\displaystyle P(\xi (U)=0)=P(\zeta (U)=0)\text{ for all }U\in ℐ}$

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