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Xiaofeng Shao

Xiaofeng Shao

University of Illinois at Urbana-Champaign, USA

Title: Martingale difference divergence and its applications to contemporary statistics

Biography

Biography: Xiaofeng Shao

Abstract

Martingale difference divergence is a metric that quantifies the conditional mean dependence of a random vector Y given another random vector X and it can be viewed as an extension of distance covariance, which characterizes the dependence and has recently much attention in the literature. We shall present applications of martingale difference divergence and its variant to several contemporary statistical problems: high dimensional variable screening, dependence testing and dimension reduction for multivariate time series.