正规化(语言学)
数学优化
计算机科学
二次方程
回归
应用数学
支持向量机的正则化研究进展
算法
数学
反问题
人工智能
统计
Tikhonov正则化
几何学
数学分析
作者
Ning Hao,Yang Feng,Hao Helen Zhang
标识
DOI:10.1080/01621459.2016.1264956
摘要
Quadratic regression (QR) models naturally extend linear models by considering interaction effects between the covariates. To conduct model selection in QR, it is important to maintain the hierarchical model structure between main effects and interaction effects. Existing regularization methods generally achieve this goal by solving complex optimization problems, which usually demands high computational cost and hence are not feasible for high-dimensional data. This article focuses on scalable regularization methods for model selection in high-dimensional QR. We first consider two-stage regularization methods and establish theoretical properties of the two-stage LASSO. Then, a new regularization method, called regularization algorithm under marginality principle (RAMP), is proposed to compute a hierarchy-preserving regularization solution path efficiently. Both methods are further extended to solve generalized QR models. Numerical results are also shown to demonstrate performance of the methods. Supplementary materials for this article are available online.
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