Duncan-Mortensen-Zakai equation

DMZ equation

An equation whose solution is the unnormalized conditional probability density function for a non-linear filtering problem. The non-linear filtering problem was motivated by the solution of the linear filtering problem, especially in [a3], where the signal or state process is modeled by the solution of a linear differential equation with a Gaussian white noise input (the formal derivative of a Brownian motion or Wiener process), so the signal process is a Gauss–Markov process. The differential of the observation process, the process from which an estimate is made of the state process, is a linear transformation of the signal plus Gaussian white noise. This linear filtering problem was motivated by one where the infinite past of the observations [a5], [a7] is required. The non-linear filtering problem is described by a signal process that is the solution of a non-linear differential equation with a Gaussian white noise input and an observation process whose differential is a non-linear function of the signal process plus a Gaussian white noise. The precise description of such a filtering problem requires the theory of stochastic differential equations (e.g., [a4]; see also Stochastic differential equation).

Before introducing the Duncan–Mortensen–Zakai equation [a1], [a6], [a8], it is necessary to describe precisely a non-linear filtering problem. A basic filtering problem is described by two stochastic processes (cf. Stochastic process), $( X ( t ) , t \geq 0 )$, which is called the signal or state process and $( Y ( t ) , t \geq 0 )$, which is called the observation process. These two processes satisfy the following stochastic differential equations:

\begin{equation} \tag{a1} d X ( t ) = a ( t , X ( t ) ) d t + b ( t , X ( t ) ) d B ( t ), \end{equation}

\begin{equation} \tag{a2} d Y ( t ) = h ( t , X ( t ) , Y ( t ) ) d t + g ( t , Y ( t ) ) d \widetilde { B } ( t ), \end{equation}

where $t \geq 0$, $X ( 0 ) = x _ { 0 }$, $Y ( 0 ) = 0$, $X ( t ) \in \mathbf{R} ^ { n }$, $Y ( t ) \in \mathbf{R} ^ { m }$, $a : \mathbf{R}_{ +} \times \mathbf{R} ^ { n } \rightarrow \mathbf{R} ^ { n }$, $b : \mathbf{R} _ { + } \times \mathbf{R} ^ { n } \rightarrow \mathcal{L} ( \mathbf{R} ^ { n } , \mathbf{R} ^ { n } )$, $h : \mathbf{R} _ { + } \times \mathbf{R} ^ { n } \times \mathbf{R} ^ { m } \rightarrow \mathbf{R} ^ { m }$, $g : {\bf R} _ { + } \times {\bf R} ^ { m } \rightarrow {\cal L} ( {\bf R} ^ { m } , {\bf R}^ { m } )$, and $( B ( t ) , t \geq 0 )$ and $( \tilde { B } ( t ) , t \geq 0 )$ are independent standard Brownian motions in ${\bf R} ^ { n }$ and $\mathbf{R} ^ { m }$, respectively. The stochastic processes are defined on a fixed probability space $( \Omega , \mathcal F , \mathsf P )$ with a filtration $( \mathcal{F} _ { t } ; t \geq 0 )$ (cf. also Stochastic processes, filtering of). Some smoothness and non-degeneracy assumptions are made on the coefficients $a$, $b$, $h$, and $g$ to ensure existence and uniqueness of the solutions of the stochastic differential equations (a1), (a2) and to ensure that the partial differential operators in the Duncan–Mortensen–Zakai equation are well defined.

A filtering problem is to estimate $\gamma ( X ( t ) )$, where $\gamma : \mathbf{R} ^ { n } \rightarrow \mathbf{R} ^ { k }$, based on the observations of (a2) until time $t$, that is, $\sigma ( Y ( u ) , u \leq t )$ which is the sigma-algebra generated by the random variables $( Y ( u ) , u \leq t )$ (cf. also Optional sigma-algebra).

The conditional probability density of $X ( t )$ given $\sigma ( Y ( u ) , u \leq t )$ represents all of the probabilistic information of $X ( t )$ that is known from $\sigma ( Y ( u ) , u \leq t )$, that is, the observation process. A stochastic partial differential equation can be given for this conditional probability density function, but it satisfies a non-linear stochastic partial differential equation.

Let $( Z ( t ) , t \geq 0 )$ be the process that satisfies the stochastic differential equation

\begin{equation*} d Z ( t ) = g ( t , Z ( t ) ) d \tilde { B } ( t ) \end{equation*}

and $Z ( 0 ) = 0$, which is obtained from (a2) by letting $h \equiv 0$. The measures $\mu_Y$ and $\mu_Z$ for the processes $( Y ( t ) , t \in [ 0 , T ] )$ and $( Z ( t ) , t \in [ 0 , T ] )$ are mutually absolutely continuous (cf. also Absolute continuity) and

\begin{equation*} \frac { d \mu _ { Y } } { d \mu _ { Z } } = \mathsf{E} _ { \mu _ { X } } [ \psi ( T ) ], \end{equation*}

where

\begin{equation*} \psi ( T ) = \end{equation*}

$f = g ^ { T } g$, and $\mathsf{E} _ { \mu _ { X } }$ is integration on the measure for the process $( X ( t ) , t \in [ 0 , T ] )$. Using some elementary properties of conditional mathematical expectation and absolute continuity of measures it follows that

\begin{equation*} \mathsf{E} [ \gamma ( X ( t ) ) | \sigma ( Y ( u , u \leq t ) ] = \frac { \mathsf{E} _ { \mu _ { X } } [ \gamma ( X ( t ) ) \psi ( t ) ] } { \mathsf{E} _ { \mu _ { X } } [ \psi ( t ) ] }. \end{equation*}

Thus, the unnormalized conditional probability density of $X ( t )$ given $\sigma ( Y ( u ) , u \leq t )$ is

\begin{equation*} r ( x , t | x _ { 0 } , \sigma ( Y ( u ) , u \leq t ) ) = \end{equation*}

\begin{equation*} = \mathsf{E} _ { \mu _ { X } } [ \psi ( t ) | X ( t ) = x ] p _ { X } ( 0 , x _ { 0 } ; t , x ) \end{equation*}

where $p_{X} $ is the transition probability density (cf. also Transition probabilities) for the Markov process $( X ( t ) , t \geq 0 )$.

The function $r$ satisfies a linear stochastic partial differential equation that is called the Duncan–Mortensen–Zakai equation [a1], [a6], [a8] and is given by

\begin{equation*} d r = L ^ { * } r + \langle f ^ { - 1 } ( t , Y ( t ) ) g ( t , X ( t ) , Y ( t ) ) , d Y ( t ) \rangle { r }, \end{equation*}

where $L ^ { * }$ is the forward differential operator for the Markov process $( X ( t ) , t \geq 0 )$. The normalization factor for $r$ to obtain the conditional probability density is $\mathsf{E} _ { \mu _ { X } } [ \psi ( t ) ]$. An extensive description of the solution of a non-linear filtering problem can be found in [a2].

References