Estimating Distributions of Parameters in Nonlinear State Space Models with Replica Exchange Particle Marginal Metropolis-Hastings Method

• Published in: Entropy (Basel, Switzerland) Vol. 24; no. 1; p. 115
• Main Authors: Inoue, Hiroaki, Hukushima, Koji, Omori, Toshiaki
• Format: Journal Article
• Language: English
• Published: Switzerland MDPI AG 01.01.2022; MDPI
• Subjects: Algorithms; Dynamical systems; Exchanging; High temperature; Low temperature; Markov analysis; Methods; Nonlinear dynamics; Parameters; particle Markov chain Monte Carlo method; particle Metropolis–Hastings method; probabilistic graphical model; Probability theory; replica exchange method; replica exchange particle Metropolis–Hastings method; Social exclusion; state space model; State space models; Stochastic models; replica exchange particle Metropolis–Hastings method; state space model; particle Markov chain Monte Carlo method; probabilistic graphical model; particle Metropolis–Hastings method; replica exchange method
• ISSN: 1099-4300; 1099-4300
• DOI: 10.3390/e24010115

Extracting latent nonlinear dynamics from observed time-series data is important for understanding a dynamic system against the background of the observed data. A state space model is a probabilistic graphical model for time-series data, which describes the probabilistic dependence between latent variables at subsequent times and between latent variables and observations. Since, in many situations, the values of the parameters in the state space model are unknown, estimating the parameters from observations is an important task. The particle marginal Metropolis-Hastings (PMMH) method is a method for estimating the marginal posterior distribution of parameters obtained by marginalization over the distribution of latent variables in the state space model. Although, in principle, we can estimate the marginal posterior distribution of parameters by iterating this method infinitely, the estimated result depends on the initial values for a finite number of times in practice. In this paper, we propose a replica exchange particle marginal Metropolis-Hastings (REPMMH) method as a method to improve this problem by combining the PMMH method with the replica exchange method. By using the proposed method, we simultaneously realize a global search at a high temperature and a local fine search at a low temperature. We evaluate the proposed method using simulated data obtained from the Izhikevich neuron model and Lévy-driven stochastic volatility model, and we show that the proposed REPMMH method improves the problem of the initial value dependence in the PMMH method, and realizes efficient sampling of parameters in the state space models compared with existing methods.