学术动态

Estimation of S-shaped functions and beyond

报告人:陈一宁

报告地点:腾讯会议ID:122-879-842

报告时间:2022年12月13日星期二16:00-17:00

 

报告摘要:

We consider the nonparametric estimation of an S-shaped regression function. The least squares estimator provides a very natural, tuning-free approach, but results in a non-convex optimisation problem, since the inflection point is unknown. We show that the estimator may nevertheless be regarded as a projection onto a finite union of convex cones, which allows us to propose a mixed primal-dual bases algorithm for its efficient, sequential computation. Our main theoretical results provide sharp oracle inequalities that yield worst-case and adaptive risk bounds for the estimation of the regression function, as well as a rate of convergence for the estimation of the inflection point. These results reveal that the estimator achieves the minimax or optimal rate of convergence for both the estimation of the regression function and its inflection point (up to a logarithmic factor in the latter case). We then discuss how our approach can be extended to handle additive models, as well as how it can be used for multiple feature detection in a change-point analysis framework.

This is joint work with Raymond Carroll, Oliver Feng, Piotr Fryzlewicz, Qiyang Han and Richard Samworth.


主讲人简介:


Yining is currently an associate professor in statistics at the London School of Economics. His current research focuses on developing new methods for statistical problems such as change-point detection and nonparametric estimation. He is also interested in understanding the computational aspects of statistical methods, as well as their applications in areas such as insurance and medical statistics. He completed his PhD in Statistics at the University of Cambridge in 2014. He is currently a member of the Royal Statistical Society’s research section committee. He also served as an associate editor of Journal of Royal Statistical Society Series B from 2017 to 2021.



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