摘要
For analyzing correlated binary data with high-dimensional covariates,we,in this paper,propose a two-stage shrinkage approach.First,we construct a weighted least-squares(WLS) type function using a special weighting scheme on the non-conservative vector field of the generalized estimating equations(GEE) model.Second,we define a penalized WLS in the spirit of the adaptive LASSO for simultaneous variable selection and parameter estimation.The proposed procedure enjoys the oracle properties in high-dimensional framework where the number of parameters grows to infinity with the number of clusters.Moreover,we prove the consistency of the sandwich formula of the covariance matrix even when the working correlation matrix is misspecified.For the selection of tuning parameter,we develop a consistent penalized quadratic form(PQF) function criterion.The performance of the proposed method is assessed through a comparison with the existing methods and through an application to a crossover trial in a pain relief study.
For analyzing correlated binary data with high-dimensional covariates, we, in this paper, propose a two-stage shrinkage approach. First, we construct a weighted least-squares (WLS) type function using a special weighting scheme on the non-conservative vector field of the generalized estimating equations (GEE) model. Second, we define a penalized WLS in the spirit of the adaptive LASSO for simultaneous variable selection and parameter estimation. The proposed procedure enjoys the oracle properties in high-dimensional framework where the number of parameters grows to infinity with the number of clusters. Moreover, we prove the consistency of the sandwich formula of the covariance matrix even when the working correlation matrix is misspecified. For the selection of tuning parameter, we develop a consistent penalized quadratic form (PQF) function criterion. The performance of the proposed method is assessed through a comparison with the existing methods and through an application to a crossover trial in a pain relief study.
基金
supported by National Natural Science Foundation of China(Grant No.11201306)
the Innovation Program of Shanghai Municipal Education Commission(Grant No.13YZ065)
the Fundamental Research Project of Shanghai Normal University(Grant No.SK201207)
the scholarship under the State Scholarship Fund by the China Scholarship Council in 2011
the Research Grant Council of Hong Kong, Hong Kong,China(Grant No.#HKBU2028/10P)
关键词
二进制数据
收缩估计
发散
加权最小二乘
ORACLE
协方差矩阵
变量分析
参数估计
correlated binary data, variable selection, diverging number of parameters, adaptive LASSO,GEE, oracle properties, sandwich covariance formula, penalized quadratic form function
