逻辑回归

Logic Regression

Journal of Computational and Graphical Statistics · 2003
被引 274 · 同刊同年前 6%
ABS 3

中文导读

提出一种自适应回归方法,将预测变量构造为二进制协变量的布尔组合,同时估计布尔表达式和系数,适用于分析SNP微阵列数据等交互作用重要的问题。

Abstract

AbstractLogic regression is an adaptive regression methodology that attempts to construct predictors as Boolean combinations of binary covariates. In many regression problems a model is developed that relates the main effects (the predictors or transformations thereof) to the response, while interactions are usually kept simple (two- to three-way interactions at most). Often, especially when all predictors are binary, the interaction between many predictors may be what causes the differences in response. This issue arises, for example, in the analysis of SNP microarray data or in some data mining problems. In the proposed methodology, given a set of binary predictors we create new predictors such as “X1, X2, X3, and X4 are true,” or “X5 or X6 but not X7 are true.” In more specific terms: we try to fit regression models of the form g(E[Y]) = b0 + b1 L1 + · · · + bn Ln , where Lj is any Boolean expression of the predictors. The Lj and bj are estimated simultaneously using a simulated annealing algorithm. This article discusses how to fit logic regression models, how to carry out model selection for these models, and gives some examples.Key Words: Adaptive model selectionBoolean logicBinary variablesInteractionsSimulated annealingSNP data

回归分析布尔组合交互作用模拟退火SNP数据