Constandina Koki scite author profile

We consider two-state Non-Homogeneous Hidden Markov Models (NHHMMs) for forecasting univariate time series. Given a set of predictors, the time series are modeled via predictive regressions with state dependent coefficients and timevarying transition probabilities that depend on the predictors via a logistic function. In a hidden Markov setting, inference for logistic regression coefficients becomes complicated and in some cases impossible due to convergence issues. In this paper, we aim to address this problem using a new latent variable scheme that utilizes the Pólya-Gamma class of distributions. We allow for model uncertainty regarding the predictors that affect the series both linearly -in the mean -and non-linearly -in the transition matrix. Predictor selection and inference on the model parameters are based on a MCMC scheme with reversible jump steps. Single-step and multiple-steps-ahead predictions are obtained by the most probable model, median probability model or a Bayesian Model Averaging approach. Using simulation experiments, we illustrate the performance of our algorithm in various setups, in terms of mixing properties, model selection and predictive ability. An empirical study on realized volatility data shows that our methodology gives improved forecasts compared to benchmark models.

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Exploring the predictability of cryptocurrencies via Bayesian hidden Markov models

Koki

Leonardos

Piliouras

2022

Research in International Business and Finance

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Constandina Koki

The X-ray luminosity function of active galactic nuclei in the redshift intervalz=3-5

Forecasting under model uncertainty: Non‐homogeneous hidden Markov models with Pòlya‐Gamma data augmentation

Exploring the predictability of cryptocurrencies via Bayesian hidden Markov models

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