B1779
Title: Ensembles of Regularized Linear Models
Authors: Ruben Zamar - University of British Columbia (Canada) [presenting]
Abstract: We propose an approach for building ensembles of regularized linear models by optimizing a novel objective function, that encourages sparsity within each model and diversity among them. Our procedure works on top of a given penalized linear regression estimator (e.g., Lasso, Elastic Net, SCAD) by fitting it to possibly overlapping subsets of features, while at the same time encouraging diversity among the subsets, to reduce the correlation between the predictions that result from each fitted model. The predictions resulting from each model are then aggregated. For the case of an Elastic Net penalty and orthogonal predictors, we give a closed form solution for the regression coefficients in each of the ensembled models. An extensive simulation study and real-data applications show that the proposed method systematically improves the prediction accuracy of the base linear estimators being ensembled. Extensions to GLMs and other models are discussed.
