TY - JOUR
T1 - An Alternative Estimation Method for Time-Varying Parameter Models
AU - Itou, Mikio
AU - Noda, Akihiko
AU - Wada, Tatsuma
N1 - Funding Information:
Funding: This research was funded by the Japan Society for the Promotion of Science Grant in Aid for Scientific Research (Nos.17K03809, 19K13747, and 20K01775), Murata Science Foundation Research Grant, and Okawa Foundation Research Grant.
Publisher Copyright:
© 2022 by the authors. Licensee MDPI, Basel, Switzerland.
PY - 2022/6
Y1 - 2022/6
N2 - A multivariate, non-Bayesian, regression-based, or feasible generalized least squares (GLS)-based approach is proposed to estimate time-varying VAR parameter models. Although it has been known that the Kalman-smoothed estimate can be alternatively estimated using GLS for univariate models, we assess the accuracy of the feasible GLS estimator compared with commonly used Bayesian estimators. Unlike the maximum likelihood estimator often used together with the Kalman filter, it is shown that the possibility of the pile-up problem occurring is negligible. In addition, this approach enables us to deal with stochastic volatility models, models with a time-dependent variance–covariance matrix, and models with non-Gaussian errors that allow us to deal with abrupt changes or structural breaks in time-varying parameters.
AB - A multivariate, non-Bayesian, regression-based, or feasible generalized least squares (GLS)-based approach is proposed to estimate time-varying VAR parameter models. Although it has been known that the Kalman-smoothed estimate can be alternatively estimated using GLS for univariate models, we assess the accuracy of the feasible GLS estimator compared with commonly used Bayesian estimators. Unlike the maximum likelihood estimator often used together with the Kalman filter, it is shown that the possibility of the pile-up problem occurring is negligible. In addition, this approach enables us to deal with stochastic volatility models, models with a time-dependent variance–covariance matrix, and models with non-Gaussian errors that allow us to deal with abrupt changes or structural breaks in time-varying parameters.
KW - generalized least squares
KW - Kalman filter
KW - non-Bayesian time-varying model
KW - vector autoregressive model
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U2 - 10.3390/econometrics10020023
DO - 10.3390/econometrics10020023
M3 - Article
AN - SCOPUS:85130068755
SN - 2225-1146
VL - 10
JO - Econometrics
JF - Econometrics
IS - 2
M1 - 23
ER -