Title :
Set-values filtering and smoothing
Author :
Morrell, Darryl R. ; Stirling, Wynn C.
Author_Institution :
Dept. of Electr. & Comput. Eng., Arizona State Univ., Tempe, AZ, USA
Abstract :
A theory of discrete-time optimal filtering and smoothing based on convex sets of probability distributions is presented. Rather than propagating a single conditional distribution as does conventional Bayesian estimation, a convex set of conditional distributions is evolved. For linear Gaussian systems, the convex set can be generated by a set of Gaussian distributions with equal covariance with means in a convex region of state space. The conventional point-valued Kalman filter is generated to a set-valued Kalman filter consisting of equations of evolution of a convex set of conditional means and a conditional covariance. The resulting estimator is an exact solution to the problem of running an infinity of Kalman filters and fixed-interval smoothers, each with different initial conditions. An application is presented to illustrate and interpret the estimator results
Keywords :
estimation theory; filtering and prediction theory; matrix algebra; probability; set theory; state estimation; Gaussian distributions; conditional covariance; convex sets; discrete-time optimal filtering; fixed-interval smoothers; linear Gaussian systems; probability distributions; set-valued Kalman filter; set-valued filtering; set-valued smoothing; Bayesian methods; Decision theory; Equations; Filtering theory; Gaussian distribution; H infinity control; Probability distribution; Smoothing methods; State estimation; State-space methods;
Journal_Title :
Systems, Man and Cybernetics, IEEE Transactions on
