In probability theory, a random measure is a measure-valued random element. Random measures are for example used in the theory of random processes, where they form many important point processes such as Poisson point processes and Cox processes.
Random measures can be defined as transition kernels or as random elements. Both definitions are equivalent. For the definitions, let
E
lE
\sigma
\Rn
A random measure
\zeta
(\Omega,lA,P)
(E,lE)
Being a transition kernel means that
B\inllE
\omega\mapsto\zeta(\omega,B)
is measurable from
(\Omega,lA)
(\R,lB(\R))
\omega\in\Omega
B\mapsto\zeta(\omega,B) (B\inlE)
is a measure on
(E,lE)
Being locally finite means that the measures
B\mapsto\zeta(\omega,B)
\zeta(\omega,\tildeB)<infty
\tildeB\inlE
\omega\in\Omega
P
In the context of stochastic processes there is the related concept of a stochastic kernel, probability kernel, Markov kernel.
Define
\tildelM:=\{\mu\mid\muismeasureon(E,lE)\}
and the subset of locally finite measures by
lM:=\{\mu\in\tildelM\mid\mu(\tildeB)<inftyforallboundedmeasurable\tildeB\inlE\}
For all bounded measurable
\tildeB
I\tilde\colon\mu\mapsto\mu(\tildeB)
from
\tildelM
\R
\tildeM
\sigma
I\tilde
\tildelM
M
\sigma
I\tilde
lM
\tildeM|lM=M
A random measure is a random element from
(\Omega,lA,P)
(\tildelM,\tildeM)
(lM,M)
See main article: article and intensity measure. For a random measure
\zeta
\operatornameE\zeta
\operatornameE\left[\intf(x) \zeta(dx)\right]=\intf(x) \operatornameE\zeta(dx)
for every positive measurable function
f
\zeta
For a random measure
\zeta
\nu
\intf(x) \zeta(dx)=0a.s.iff\intf(x) \nu(dx)=0
for all positive measurable functions is called the supporting measure of
\zeta
For a random measure
\zeta
lL\zeta(f)=\operatornameE\left[\exp\left(-\intf(x) \zeta(dx)\right)\right]
for every positive measurable function
f
For a random measure
\zeta
\intf(x)\zeta(dx)
\zeta(A):=\int1A(x)\zeta(dx)
for positive
lE
f
The distribution of a random measure is uniquely determined by the distributions of
\intf(x)\zeta(dx)
for all continuous functions with compact support
f
E
lI\subsetlE
lE
\sigma(lI)=lE
lI
f
A measure generally might be decomposed as:
\mu=\mud+\mua=\mud+
| N | |
| \sum | |
| n=1 |
\kappan
| \delta | |
| Xn |
,
\mud
\mua
A random measure of the form:
| N | |
| \mu=\sum | |
| n=1 |
| \delta | |
| Xn |
,
where
\delta
Xn
Xn
\mud
In the formal notation of above a random counting measure is a map from a probability space to the measurable space a measurable space. Here
NX
N\inMX
The definitions of expectation measure, Laplace functional, moment measures and stationarity for random measures follow those of point processes. Random measures are useful in the description and analysis of Monte Carlo methods, such as Monte Carlo numerical quadrature and particle filters.