TY - JOUR
T1 - On Sparse Ensemble Methods
T2 - An Application to Short-term Predictions of the Evolution of COVID-19
AU - Benítez Peña, Sandra
AU - Carrizosa, Emilio
AU - Guerrero, Vanesa
AU - Jiménez-Gamero, M. Dolores
AU - Martín-Barragán, Belén
AU - del Rio, Cristina Molero
AU - Ramírez-Cobo, Pepa
AU - Romero Morales, Dolores
AU - Sillero-Denamiel, M. Remedios
PY - 2021/12
Y1 - 2021/12
N2 - Since the seminal paper by Bates and Granger in 1969, a vast number of ensemble methods that combine different base regressors to generate a unique one have been proposed in the literature. The so-obtained regressor method may have better accuracy than its components, but at the same time it may overfit, it may be distorted by base regressors with low accuracy, and it may be too complex to understand and explain. This paper proposes and studies a novel Mathematical Optimization model to build a sparse ensemble, which trades off the accuracy of the ensemble and the number of base regressors used. The latter is controlled by means of a regularization term that penalizes regressors with a poor individual performance. Our approach is flexible to incorporate desirable properties one may have on the ensemble, such as controlling the performance of the ensemble in critical groups of records, or the costs associated with the base regressors involved in the ensemble. We illustrate our approach with real data sets arising in the COVID-19 context.
AB - Since the seminal paper by Bates and Granger in 1969, a vast number of ensemble methods that combine different base regressors to generate a unique one have been proposed in the literature. The so-obtained regressor method may have better accuracy than its components, but at the same time it may overfit, it may be distorted by base regressors with low accuracy, and it may be too complex to understand and explain. This paper proposes and studies a novel Mathematical Optimization model to build a sparse ensemble, which trades off the accuracy of the ensemble and the number of base regressors used. The latter is controlled by means of a regularization term that penalizes regressors with a poor individual performance. Our approach is flexible to incorporate desirable properties one may have on the ensemble, such as controlling the performance of the ensemble in critical groups of records, or the costs associated with the base regressors involved in the ensemble. We illustrate our approach with real data sets arising in the COVID-19 context.
KW - Machine Learning
KW - Ensemble Method
KW - Mathematical Optimization
KW - Selective Sparsity
KW - COVID-19
KW - Machine Learning
KW - Ensemble Method
KW - Mathematical Optimization
KW - Selective Sparsity
KW - COVID-19
U2 - 10.1016/j.ejor.2021.04.016
DO - 10.1016/j.ejor.2021.04.016
M3 - Journal article
SN - 0377-2217
VL - 295
SP - 648
EP - 663
JO - European Journal of Operational Research
JF - European Journal of Operational Research
IS - 2
ER -