频数推理
估计员
选型
协变量
数学
背景(考古学)
非参数统计
参数化模型
参数统计
线性模型
半参数模型
信息标准
计量经济学
应用数学
类型(生物学)
统计
贝叶斯推理
贝叶斯概率
生物
古生物学
生态学
作者
Rong Zhu,Alan T. K. Wan,Xinyu Zhang,Guohua Zou
标识
DOI:10.1080/01621459.2018.1456936
摘要
In the last decade, significant theoretical advances have been made in the area of frequentist model averaging (FMA); however, the majority of this work has emphasized parametric model setups. This article considers FMA for the semiparametric varying-coefficient partially linear model (VCPLM), which has gained prominence to become an extensively used modeling tool in recent years. Within this context, we develop a Mallows-type criterion for assigning model weights and prove its asymptotic optimality. A simulation study and a real data analysis demonstrate that the FMA estimator that arises from this criterion is vastly preferred to information criterion score-based model selection and averaging estimators. Our analysis is complicated by the fact that the VCPLM is subject to uncertainty arising not only from the choice of covariates, but also whether the covariate should enter the parametric or nonparametric parts of the model. Supplementary materials for this article are available online.
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