Bessel process
In mathematics, a Bessel process, named after Friedrich Bessel. The n-dimensional Bessel process is the solution to the stochastic differential equation
where W is a 1-dimensional Wiener process
[Image:BesselProcess1D.svg|thumb|Three realizations of Bessel Processes.]
Formal definition
The Bessel process of order n is the real-valued process X given bywhere ||·|| denotes the Euclidean norm in Rn and W is an n-dimensional Wiener process. Note that this SDE makes sense for any real parameter .
Notation
A notation for the Bessel process of dimension started at zero is.In specific dimensions
For n ≥ 2, the n-dimensional Wiener process started at the origin is transient from its starting point: with probability one, i.e., Xt > 0 for all t > 0. It is, however, neighbourhood-recurrent for n = 2, meaning that with probability 1, for any r > 0, there are arbitrarily large t with Xt < r; on the other hand, it is truly transient for n > 2, meaning that Xt ≥ r for all t sufficiently large.For n ≤ 0, the Bessel process is usually started at points other than 0, since the drift to 0 is so strong that the process becomes stuck at 0 as soon as it hits 0.
Relationship with Brownian motion
0- and 2-dimensional Bessel processes are related to local times of Brownian motion via the Ray–Knight theorems.The law of a Brownian motion near x-extrema is the law of a 3-dimensional Bessel process.