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Moderate Deviations of a Random Riccati Equation

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journal contribution
posted on 2010-06-01, 00:00 authored by Soummya KarSoummya Kar, José M. F. Moura

The paper characterizes the invariant filtering measures resulting from Kalman filtering with intermittent observations in which the observation arrival is modeled as a Bernoulli process with packet arrival probability γ̅. Our prior work showed that, for γ̅ >; 0 , the sequence of random conditional error covariance matrices converges weakly to a unique invariant distribution μγ̅. This paper shows that, as γ̅ approaches one, the family {μγ̅}γ̅ >; 0 satisfies a moderate deviations principle with good rate function I (·): (1) as γ̅ ↑ 1 , the family {μγ̅} converges weakly to the Dirac measure δP*concentrated on the fixed point of the associated discrete time Riccati operator; (2) the probability of a rare event (an event bounded away from P*) under μγ̅ decays to zero as a power law of (1-γ̅) as γ̅↑ 1; and, (3) the best power law decay exponent is obtained by solving a deterministic variational problem involving the rate function I (·). For specific scenarios, the paper develops computationally tractable methods that lead to efficient estimates of rare event probabilities under μγ̅.

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Date

2010-06-01

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