Moderate Deviations of the Random Riccati Equation

Abstract

We characterize the invariant filtering measures resulting from Kalman filtering with intermittent observations (Bruno), where the observation arrival is modeled as a Bernoulli process. In Riccati-weakconv, it was shown that there exists a γ\sb>0 such that for every observation packet arrival probability γ, γ>γ\sb>0, the sequence of random conditional error covariance matrices converges in distribution to a unique invariant distribution μγ (independent of the filter initialization.) In this paper, we prove that, for controllable and observable systems, γ\sb=0 and that, as γ 1, the family \μγ\γ>0 of invariant distributions satisfies a moderate deviations principle (MDP) with a good rate function I. The rate function I is explicitly identified. In particular, our results show: