English

Sharp phase transitions in high-dimensional changepoint detection

Statistics Theory 2025-03-27 v2 Statistics Theory

Abstract

We study a hypothesis testing problem in the context of high-dimensional changepoint detection. Given a matrix XRp×nX \in \R^{p \times n} with independent Gaussian entries, the goal is to determine whether or not a sparse, non-null fraction of rows in XX exhibits a shift in mean at a common index between 11 and nn. We focus on three aspects of this problem: the sparsity of non-null rows, the presence of a single, common changepoint in the non-null rows, and the signal strength associated with the changepoint. Within an asymptotic regime relating the data dimensions nn and pp to the signal sparsity and strength, the information-theoretic limits of this testing problem are characterized by a formula that determines whether or not there exists a testing procedure whose sum of Type I and II errors tends to zero as n,pn,p \to \infty. The formula, called the \emph{detection boundary}, partitions the parameter space into a two regions: one where it is possible to detect the presence of a single aligned changepoint (detectable region), and another where no test is able to consistently distinguish the mean matrix from one with constant rows (undetectable region).

Keywords

Cite

@article{arxiv.2403.11704,
  title  = {Sharp phase transitions in high-dimensional changepoint detection},
  author = {Daniel Xiang and Chao Gao},
  journal= {arXiv preprint arXiv:2403.11704},
  year   = {2025}
}
R2 v1 2026-06-28T15:24:05.048Z