Title :
On exact filters for continuous signals with discrete observations
Author :
Kouritzin, Michael A.
Author_Institution :
Dept. of Math. Sci., Alberta Univ., Edmonton, Alta., Canada
fDate :
5/1/1998 12:00:00 AM
Abstract :
Many filtering applications have continuous state dynamics Xt =∫0tm(Xs)ds+σWt +ρ, discrete observations Yj=Y(tj), and nonadditive or non-Gaussian observation noise. One wants to calculate the conditional probability Pr{Xt∈dz|Yj, 0⩽tj ⩽t} economically. In this paper we show that a combination of convolution, scaling, and substitutions efficiently solves this problem under certain conditions. Our method is easy to use and assumes nothing about the observations other than the ability to construct p(Yj )|X(tj), the conditional density of the jth observation given the current state
Keywords :
Brownian motion; convolution; filtering theory; nonlinear filters; observability; probability; Brownian motion; conditional probability; continuous signals; convolution; diffusion equation; discrete observations; exact filters; nonlinear filtering; scaling; state dynamics; Additive noise; Convolution; Filtering theory; Information filtering; Information filters; Nonlinear equations; Nonlinear filters; Probability; State estimation; Time measurement;
Journal_Title :
Automatic Control, IEEE Transactions on
