Abstract
We propose probability and density forecast combination methods that are defined using the entropy regularized Wasserstein distance. First, we provide a theoretical characterization of the combined density forecast based on the regularized Wasserstein distance under the assumption. More specifically, we show that the regularized Wasserstein barycenter between multivariate Gaussian input densities is multivariate Gaussian, and provide a simple way to compute mean and its variance–covariance matrix. Second, we show how this type of regularization can improve the predictive power of the resulting combined density. Third, we provide a method for choosing the tuning parameter that governs the strength of regularization. Lastly, we apply our proposed method to the U.S. inflation rate density forecasting, and illustrate how the entropy regularization can improve the quality of predictive density relative to its unregularized counterpart.
Highlights
We study a class of density forecast combination methods based on a Wasserstein metric
The theorem shows that regularization does not impact the mean of the barycenter; it does have an impact on its variance–covariance matrix
The entropy regularization smooths the resulting combined forecast, and it offers a flexible way to adjust the dispersion of the predictive density when it is needed
Summary
We study a class of density forecast combination methods based on a Wasserstein metric. This combined probability/density can be defined by an optimization problem, but the optimization problem in this case includes an additional regularization term that penalizes densities with low entropy, which ensures the combined density forecast is smooth One advantage of this approach is that the entropy regularized Wasserstein barycenter can be found in a much more computationally efficient manner than its unregularized counterpart when the input densities are multi-dimensional [4]. Several existing aggregation methods in the literature can be formulated with the choice of a specific metric within this unified framework After discussing these existing approaches, we introduce our proposal of using the entropy regularized Wasserstein barycenter.
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