主题:estimation of linear functionals in high-dimensional linear models: from sparsity to nonsparsity
时间:2024年04月24日10:00-11:30
地点:腾讯会议:438-014-7163
主持人:姜荣 教授
报告人简介:
赵俊龙,北京师范大学统计学院教授。主要从事统计学和机器学习相关研究,包括:高维数据分析、统计机器学习、稳健统计等。在统计学各类期刊发表sci论文近五十篇,部分结果发表在统计学国际顶级期刊jrssb,aos、jasa,biometrika等。主持多项国家自然科学基金项目,参与国家自然科学基金重点项目。任中国现场统计学会高维数据分会、北京大数据学会等多个学术分会理事或常务理事。
讲座简介:
high dimensional linear models are commonly used in practice. in many applications, one is interested in linear transformations $\beta^\top x$ of regression coefficients $\beta\in \mr^p$, where $x$ is a specific point and is not required to be identically distributed as the training data. one common approach is the plug-in technique which first estimates $\beta$, then plugs the estimator in the linear transformation for prediction. despite its popularity, estimation of $\beta$ can be difficult for high dimensional problems. commonly used assumptions in the literature include that the signal of coefficients $\beta$ is sparse and predictors are weakly correlated. these assumptions, however, may not be easily verified, and can be violated in practice. when $\beta$ is non-sparse or predictors are strongly correlated, estimation of $\beta$ can be very difficult. in this paper, we propose a novel pointwise estimator for linear transformations of $\beta$. this new estimator greatly relaxes the common assumptions for high dimensional problems, and is adaptive to the degree of sparsity of $\beta$ and strength of correlations among the predictors. in particular, $\beta$ can be sparse or non-sparse and predictors can be strongly or weakly correlated. the proposed method is simple for implementation. numerical and theoretical results demonstrate the competitive advantages of the proposed method for a wide range of problems.