We use a Bayesian vector autoregression with stochastic volatility to forecast government bond yields. We form the conjugate prior from a no-arbitrage affine term structure model. The model improves on the accuracy of point and density forecasts from a no-change random walk and an affine term structure model with stochastic volatility. Our proposed approach may succeed by relaxing the no-arbitrage affine term structure model's requirements that yields obey a factor structure and that the factors follow a Markov process. In the term structure model, its cross-equation no-arbitrage restrictions on the factor loadings appear to play a marginal role in forecasting gains.
Carriero A., Clark T.E., Marcellino M. (2021). No-arbitrage priors, drifting volatilities, and the term structure of interest rates. JOURNAL OF APPLIED ECONOMETRICS, 36(5), 495-516 [10.1002/jae.2828].
No-arbitrage priors, drifting volatilities, and the term structure of interest rates
Carriero A.Primo
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2021
Abstract
We use a Bayesian vector autoregression with stochastic volatility to forecast government bond yields. We form the conjugate prior from a no-arbitrage affine term structure model. The model improves on the accuracy of point and density forecasts from a no-change random walk and an affine term structure model with stochastic volatility. Our proposed approach may succeed by relaxing the no-arbitrage affine term structure model's requirements that yields obey a factor structure and that the factors follow a Markov process. In the term structure model, its cross-equation no-arbitrage restrictions on the factor loadings appear to play a marginal role in forecasting gains.| File | Dimensione | Formato | |
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No_arbitrage_priors.pdf
Open Access dal 19/05/2023
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