Optimal Inference with a Multidimensional Multiscale Statistic
Abstract
We observe a stochastic process on () satisfying + , , where is a given scale parameter (`sample size'), is the standard Brownian sheet on and is the unknown function of interest. We propose a multivariate multiscale statistic in this setting and prove its almost sure finiteness; this extends the work of D\"umbgen and Spokoiny (2001) who proposed the analogous statistic for . We use the proposed multiscale statistic to construct optimal tests for testing versus (i) appropriate H\"{o}lder classes of functions, and (ii) alternatives of the form , where is an axis-aligned hyperrectangle in and ; and unknown. In the process we generalize Theorem 6.1 of D\"umbgen and Spokoiny (2001) about stochastic processes with sub-Gaussian increments on a pseudometric space, which is of independent interest.
Cite
@article{arxiv.1806.02194,
title = {Optimal Inference with a Multidimensional Multiscale Statistic},
author = {Pratyay Datta and Bodhisattva Sen},
journal= {arXiv preprint arXiv:1806.02194},
year = {2018}
}
Comments
39 pages