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Nonlinear Filters for Hidden Markov Models of Regime Change with Fast Mean-Reverting States

We consider filtering for a hidden Markov model that evolves with multiple time scales in the hidden states. In particular, we consider the case where one of the states is a scaled Ornstein-Uhlenbeck process with fast reversion to a shifting-mean that is controlled by a continuous time Markov chain modeling regime change. We show that the nonlinear filter for such a process can be approximated by an averaged filter that asymptotically coincides with the true nonlinear filter of the regime-changing Markov chain as the rate of mean reversion approaches infinity. The asymptotics exploit weak converge of the state variables to an invariant distribution, which is significantly different from the strong convergence used to obtain asymptotic results in "Filtering for Fast Mean-Reverting Processes" (19).

preprint2012arXivOpen access
Andrew Papanicolaou
math.PR
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Andrew Papanicolaou

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