报告题目:  Distances between Random Orthogonal Matrices and Independent Normals

报告人: Tiefeng Jiang, University of Minnesota, USA

报告时间:  2022-12-15周四   10:00-11:00 

报告地点：腾讯会议：342-367-221 会议密码：235711

摘要: 

We study the distance between Haar-orthogonal matrices and independent normal random variables.The distance is measured by the total variation distance, the Kullback-Leibler distance, the Hellinger distance and the Euclidean distance. They appear with different features. Optimal rates are obtained. Applications to data storage and quantum computing will be discussed.