Predicting equity premium using dynamic model averaging. Does the state–space representation matter? |
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Institution: | 1. Department of Finance, National Sun-Yat Sen University, Kaohsiung, Taiwan;2. College of Management, National Sun-Yat Sen University, Kaohsiung, Taiwan;1. Stockholm University, Sweden;2. IBM, Switzerland;1. Department of Economics, Helmut Schmidt University, Holstenhofweg 85, P.O.B. 700822, 22008 Hamburg, Germany;2. Center for Medical Biotechnology, University of Duisburg–Essen, Universitätsstraße 2, 45141 Essen, Germany |
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Abstract: | Dynamic model averaging (DMA) has become a very useful tool with regards to dealing with two important aspects of time-series analysis, namely, parameter instability and model uncertainty. An important component of DMA is the Kalman filter. It is used to filter out the latent time-varying regression coefficients of the predictive regression of interest, and produce the model predictive likelihood, which is needed to construct the probability of each model in the model set. To apply the Kalman filter, one must write the model of interest in linear state–space form. In this study, we demonstrate that the state–space representation has implications on out-of-sample prediction performance, and the degree of shrinkage. Using Monte Carlo simulations as well as financial data at different sampling frequencies, we document that the way in which the current literature tends to formulate the candidate time-varying parameter predictive regression in linear state–space form ignores empirical features that are often present in the data at hand, namely, predictor persistence and predictor endogeneity. We suggest a straightforward way to account for these features in the DMA setting. Results using the widely applied Goyal and Welch (2008) dataset document that modifying the DMA framework as we suggest has a bearing on equity premium point prediction performance from a statistical as well as an economic viewpoint. |
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Keywords: | Kalman filter Endogeneity Model uncertainty Parameter instability Predictor persistence State–space representation |
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