Flexible Time-Varying Betas in a Novel Mixture Innovation Factor Model with Latent Threshold
Özet
This paper introduces a new methodology to estimate time-varying alphas and betas
in conditional factor models, which allows substantial flexibility in a time-varying framework.
To circumvent problems associated with the previous approaches, we introduce a Bayesian timevarying parameter model where innovations of the state equation have a spike-and-slab mixture
distribution. The mixture distribution specifies two states with a specific probability. In the first
state, the innovation variance is set close to zero with a certain probability and parameters stay
relatively constant. In the second state, the innovation variance is large and the change in parameters
is normally distributed with mean zero and a given variance. The latent state is specified with a
threshold that governs the state change. We allow a separate threshold for each parameter; thus, the
parameters may shift in an unsynchronized manner such that the model moves from one state to
another when the change in the parameter exceeds the threshold and vice versa. This approach offers
great flexibility and nests a plethora of other time-varying model specifications, allowing us to assess
whether the betas of conditional factor models evolve gradually over time or display infrequent,
but large, shifts. We apply the proposed methodology to industry portfolios within a five-factor
model setting and show that the threshold Capital Asset Pricing Model (CAPM) provides robust beta
estimates coupled with smaller pricing errors compared to the alternative approaches. The results
have significant implications for the implementation of smart beta strategies that rely heavily on the
accuracy and stability of factor betas and yields.
Cilt
9Sayı
8Bağlantı
https://hdl.handle.net/11363/5037Koleksiyonlar
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