稳健优化
稳健性(进化)
数学优化
瓦瑟斯坦度量
计算机科学
线性规划
稳健回归
线性回归
数学
机器学习
应用数学
化学
基因
生物化学
作者
Ruidi Chen,Ioannis Ch. Paschalidis
出处
期刊:Foundations and trends® in optimization
[Now Publishers]
日期:2020-01-01
卷期号:4 (1-2): 1-243
被引量:1
标识
DOI:10.1561/9781680837735
摘要
This monograph develops a comprehensive statistical learning framework that is robust to (distributional) perturbations in the data using Distributionally Robust Optimization (DRO) under the Wasserstein metric. Beginning with fundamental properties of the Wasserstein metric and the DRO formulation, we explore duality to arrive at tractable formulations and develop finite-sample, as well as asymptotic, performance guarantees. We consider a series of learning problems, including (i) distribution-ally robust linear regression; (ii) distributionally robust regression with group structure in the predictors; (iii) distributionally robust multi-output regression and multiclass classification, (iv) optimal decision making that combines distributionally robust regression with nearest-neighbor estimation; (v) distributionally robust semi-supervised learning, and (vi) distributionally robust reinforcement learning. A tractable DRO relaxation for each problem is being derived, establishing a connection between robustness and regularization, and obtaining bounds on the prediction and estimation errors of the solution. Beyond theory, we include numerical experiments and case studies using synthetic and real data. The real data experiments are all associated with various health informatics problems, an application area which provided the initial impetus for this work.
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