## 第22回統計的機械学習セミナー(2014.11.27)

日時：１１月２７日（木）１５：００－

場所：セミナー室３（D312A）

Speaker:

Aaditya Ramdas (Carnegie Mellon University)

Title: On the Power of a Nonparametric Two Sample Test in High Dimensions

Abstract: Nonparametric two sample testing deals with the question of consistently deciding if two distributions are different, given samples from both, without making any parametric assumptions about the form of the distributions. The current literature is split into two kinds of tests – those which are consistent without any assumptions about how the distributions may differ (general alternatives), and those which are designed to specifically test easier alternatives, like a difference in means (mean-shift alternatives).

In this talk, I will show how to explicitly characterize the power of a popular nonparametric two sample test, designed for general alternatives, under a mean-shift alternative in the high-dimensional setting. Specifically, we explicitly derive the power of the linear-time Maximum Mean Discrepancy statistic using the Gaussian kernel, where the dimension and sample size can both tend to infinity at any rate, and the two distributions differ in their means. As a corollary, we find that if the signal-to-noise ratio is held constant, then the test’s power goes to one if the number of samples increases faster than the dimension increases, almost independent of the bandwidth choice. This is the first explicit power derivation for a general nonparametric test in the high-dimensional setting, and also the first analysis of how tests designed for general alternatives perform when faced with easier ones.