HIGH-DIMENSIONAL ASYMPTOTICS OF LIKELIHOOD RATIO TESTS IN THE GAUSSIAN SEQUENCE MODEL UNDER CONVEX CONSTRAINTS
成果类型:
Article
署名作者:
Han, Qiyang; Sen, Bodhisattva; Shen, Yandi
署名单位:
Rutgers University System; Rutgers University New Brunswick; Columbia University; University of Washington; University of Washington Seattle
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/21-AOS2111
发表日期:
2022
页码:
376-406
关键词:
GOODNESS-OF-FIT
Nonparametric Regression
hypothesis
freedom
homogeneity
normality
error
摘要:
In the Gaussian sequence model Y = mu + xi, we study the likelihood ratio test (LRT) for testing H-0 : mu = mu(0) versus H-1 : mu is an element of K, where mu(0) is an element of K, and K is a closed convex set in R-n. In particular, we show that under the null hypothesis, normal approximation holds for the log-likelihood ratio statistic for a general pair (mu(0), K), in the high-dimensional regime where the estimation error of the associated least squares estimator diverges in an appropriate sense. The normal approximation further leads to a precise characterization of the power behavior of the LRT in the high-dimensional regime. These characterizations show that the power behavior of the LRT is in general nonuniform with respect to the Euclidean metric, and illustrate the conservative nature of existing minimax optimality and suboptimality results for the LRT. A variety of examples, including testing in the orthant/circular cone, isotonic regression, Lasso and testing parametric assumptions versus shape-constrained alternatives, are worked out to demonstrate the versatility of the developed theory.
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