Abstract
We address the problem of dynamic variable selection in time series regression with unknown residual variances, where the set of active predictors is allowed to evolve over time. To capture time-varying variable selection uncertainty, we introduce new dynamic shrinkage priors for the time series of regression coefficients. These priors are characterized by two main ingredients: smooth parameter evolutions and intermittent zeroes for modeling predictive breaks. More formally, our proposed Dynamic Spike-and-Slab (DSS) priors are constructed as mixtures of two processes: a spike process for the irrelevant coefficients and a slab autoregressive process for the active coefficients. The mixing weights are themselves time-varying and depend on lagged values of the series. Our DSS priors are probabilistically coherent in the sense that their stationary distribution is fully known and characterized by spike-and-slab marginals. For posterior sampling over dynamic regression coefficients, model selection indicators as well as unknown dynamic residual variances, we propose a Dynamic SSVS algorithm based on forward-filtering and backward-sampling. To scale our method to large data sets, we develop a Dynamic EMVS algorithm for MAP smoothing. We demonstrate, through simulation and a topical macroeconomic dataset, that DSS priors are very effective at separating active and noisy coefficients. Our fast implementation significantly extends the reach of spike-and-slab methods to big time series data.
Highlights
We address the problem of dynamic variable selection in time series regression with unknown residual variances, where the set of active predictors is allowed to evolve over time
The Dynamic Spike-and-Slab (DSS) process relates to the Gaussian mixture of autoregressive (GM AR) process of Kalliovirta et al (2015), which was conceived as a model for time series data with regime switches
This paper introduces a new class of dynamic shrinkage priors, where the stationary distribution is fully known and characterized by spike-and-slab marginals
Summary
For dynamic linear modeling with many potential predictors, the assumption of a static generative model with a fixed subset of regressors (albeit with time-varying regressor effects) may be misleadingly restrictive. Besides time-varying regressor effects, we adopt the point of view that the regressors are allowed to enter and leave the model as time progresses, rendering the subset selection problem dynamic This anticipation can be reflected by the following sparsity manifestations in the matrix of regression coefficients B0p×T = [β01, . The main thrust of this work is to introduce Dynamic Spike-and-Slab (DSS) priors, a new class of time series priors, which induce either smoothness or shrinkage towards zero These processes are formed as mixtures of two (stationary) time series: one for the active and another for the negligible coefficients. For efficient posterior sampling under the Gaussian spike-and-slab process, we develop Dynamic SSVS, a new extension of SSVS of George and McCulloch (1993) for time series regression with closed-form forward-smoothing and backward-sampling updates (Fruhwirth-Schnatter 1994).
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