Poisson random measure

Let $(E,{\mathcal {A}},\mu )$ be some measure space with $\sigma$ -finite measure $\mu$ . The Poisson random measure with intensity measure $\mu$ is a family of random variables $\{N_{A}\}_{A\in {\mathcal {A}}}$ defined on some probability space $(\Omega ,{\mathcal {F}},\mathrm {P} )$ such that

i) $\forall A\in {\mathcal {A}},\quad N_{A}$ is a Poisson random variable with rate $\mu (A)$ .

ii) If sets $A_{1},A_{2},\ldots ,A_{n}\in {\mathcal {A}}$ don't intersect then the corresponding random variables from i) are mutually independent.

iii) $\forall \omega \in \Omega \;N_{\bullet }(\omega )$ is a measure on $(E,{\mathcal {A}})$

Existence[edit]

If $\mu \equiv 0$ then $N\equiv 0$ satisfies the conditions i)–iii). Otherwise, in the case of finite measure $\mu$ , given $Z$ , a Poisson random variable with rate $\mu (E)$ , and $X_{1},X_{2},\ldots$ , mutually independent random variables with distribution ${\frac {\mu }{\mu (E)}}$ , define $N_{\cdot }(\omega )=\sum \limits _{i=1}^{Z(\omega )}\delta _{X_{i}(\omega )}(\cdot )$ where $\delta _{c}(A)$ is a degenerate measure located in $c$ . Then $N$ will be a Poisson random measure. In the case $\mu$ is not finite the measure $N$ can be obtained from the measures constructed above on parts of $E$ where $\mu$ is finite.

Applications[edit]

This kind of random measure is often used when describing jumps of stochastic processes, in particular in Lévy–Itō decomposition of the Lévy processes.

Generalizations[edit]

The Poisson random measure generalizes to the Poisson-type random measures, where members of the PT family are invariant under restriction to a subspace.

References[edit]

Sato, K. (2010). Lévy Processes and Infinitely Divisible Distributions. Cambridge University Press. ISBN 978-0-521-55302-5.