Asymptotic Properties of the Maximum Likelihood Estimator for Markov-switching Observation-driven Models

Abstract

A Markov-switching observation-driven model is a stochastic process ((St,Yt))t ∈ Z where (St)t ∈ Z is an unobserved Markov chain on a finite set and (Yt)t ∈ Z is an observed stochastic process such that the conditional distribution of Yt given (Yτ)τ ≤ t-1 and (Sτ)τ ≤ t depends on (Yτ)τ ≤ t-1 and St. In this paper, we prove consistency and asymptotic normality of the maximum likelihood estimator for such model. As a special case, we also give conditions under which the maximum likelihood estimator for the widely applied Markov-switching generalised autoregressive conditional heteroscedasticity model introduced by Haas, Mittnik, and Paolella (2004b) is consistent and asymptotically normal.

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