In the mathematical field of dynamical systems, a random dynamical system is a dynamical system in which the equations of motion have an element of randomness to them. Random dynamical systems are characterized by a state space S, a set of maps
\Gamma
\Gamma
X\inS
An example of a random dynamical system is a stochastic differential equation; in this case the distribution Q is typically determined by noise terms. It consists of a base flow, the "noise", and a cocycle dynamical system on the "physical" phase space. Another example is discrete state random dynamical system; some elementary contradistinctions between Markov chain and random dynamical system descriptions of a stochastic dynamics are discussed.[2]
Let
f:Rd\toRd
d
\varepsilon>0
X(t,\omega;x0)
\left\{\begin{matrix}dX=f(X)dt+\varepsilondW(t);\ X(0)=x0;\end{matrix}\right.
exists for all positive time and some (small) interval of negative time dependent upon
\omega\in\Omega
W:R x \Omega\toRd
d
(\Omega,l{F},P):=\left(C0(R;Rd),l{B}(C0(R;Rd)),\gamma\right).
In this context, the Wiener process is the coordinate process.
Now define a flow map or (solution operator)
\varphi:R x \Omega x Rd\toRd
\varphi(t,\omega,x0):=X(t,\omega;x0)
(whenever the right hand side is well-defined). Then
\varphi
(Rd,\varphi)
An i.i.d random dynamical system in the discrete space is described by a triplet
(S,\Gamma,Q)
S
\{s1,s2, … ,sn\}
\Gamma
S → S
n x n
Q
\sigma
\Gamma
x0
S
\alpha1
\Gamma
Q
x1=\alpha1(x0)
\alpha2
Q
x2=\alpha2(x1)
The random variable
Xn
Xn=\alphan\circ\alphan-1\circ...\circ\alpha1(X0)
Xn
Reversely, can, and how, a given MC be represented by the compositions of i.i.d. random transformations? Yes, it can, but not unique. The proof for existence is similar with Birkhoff–von Neumann theorem for doubly stochastic matrix.
Here is an example that illustrates the existence and non-uniqueness.
Example: If the state space
S=\{1,2\}
\Gamma
M=\left(\begin{array}{cc} 0.4&0.6\ 0.7&0.3\end{array}\right)
M=0.6\left(\begin{array}{cc} 0&1\ 1&0 \end{array}\right)+0.3\left(\begin{array}{cc} 1&0\ 0&1\end{array}\right)+0.1\left(\begin{array}{cc} 1&0\ 1&0\end{array}\right).
In the meantime, another decomposition could be
M=0.18\left(\begin{array}{cc} 0&1\ 0&1\end{array}\right)+0.28\left(\begin{array}{cc} 1&0\ 1&0\end{array}\right) +0.42\left(\begin{array}{cc} 0&1\ 1&0\end{array}\right)+0.12\left(\begin{array}{cc} 1&0\ 0&1 \end{array}\right).
Formally,[3] a random dynamical system consists of a base flow, the "noise", and a cocycle dynamical system on the "physical" phase space. In detail.
Let
(\Omega,l{F},P)
\vartheta:R x \Omega\to\Omega
s\inR
\varthetas:\Omega\to\Omega
P(E)=P
| -1 | |
| (\vartheta | |
| s |
(E))
E\inl{F}
s\inR
Suppose also that
\vartheta0=id\Omega:\Omega\to\Omega
\Omega
s,t\inR
\varthetas\circ\varthetat=\varthetas
That is,
\varthetas
s\inR
(\Omega,l{F},P)
s
s
\varthetas
(\Omega,l{F},P,\vartheta)
Now let
(X,d)
\varphi:R x \Omega x X\toX
(l{B}(R) ⊗ l{F} ⊗ l{B}(X),l{B}(X))
\omega\in\Omega
\varphi(0,\omega)=idX:X\toX
X
\omega\in\Omega
(t,x)\mapsto\varphi(t,\omega,x)
\varphi
\omega\in\Omega
\varphi(t,\varthetas(\omega))\circ\varphi(s,\omega)=\varphi(t+s,\omega).
In the case of random dynamical systems driven by a Wiener process
W:R x \Omega\toX
\varthetas:\Omega\to\Omega
W(t,\varthetas(\omega))=W(t+s,\omega)-W(s,\omega)
This can be read as saying that
\varthetas
s
x0
\omega
s
t
s
x0
(t+s)
The notion of an attractor for a random dynamical system is not as straightforward to define as in the deterministic case. For technical reasons, it is necessary to "rewind time", as in the definition of a pullback attractor.[4] Moreover, the attractor is dependent upon the realisation
\omega