Projection inference for high-dimensional covariance matrices with structured shrinkage targets


Journal article


Fabian Mies, Ansgar Steland
Electronic Journal of Statistics, vol. 18(1), 2024, pp. 1643-1676


arXiv
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APA   Click to copy
Mies, F., & Steland, A. (2024). Projection inference for high-dimensional covariance matrices with structured shrinkage targets. Electronic Journal of Statistics, 18(1), 1643–1676. https://doi.org/10.1214/24-EJS2225


Chicago/Turabian   Click to copy
Mies, Fabian, and Ansgar Steland. “Projection Inference for High-Dimensional Covariance Matrices with Structured Shrinkage Targets.” Electronic Journal of Statistics 18, no. 1 (2024): 1643–1676.


MLA   Click to copy
Mies, Fabian, and Ansgar Steland. “Projection Inference for High-Dimensional Covariance Matrices with Structured Shrinkage Targets.” Electronic Journal of Statistics, vol. 18, no. 1, 2024, pp. 1643–76, doi:10.1214/24-EJS2225.


BibTeX   Click to copy

@article{fabian2024a,
  title = {Projection inference for high-dimensional covariance matrices with structured shrinkage targets},
  year = {2024},
  issue = {1},
  journal = {Electronic Journal of Statistics},
  pages = {1643-1676},
  volume = {18},
  doi = {10.1214/24-EJS2225},
  author = {Mies, Fabian and Steland, Ansgar}
}

Analyzing large samples of high-dimensional data under dependence is a challenging statistical problem as long time series may have change points, most importantly in the mean and the marginal covariances, for which one needs valid tests. Inference for large covariance matrices is especially difficult due to noise accumulation, resulting in singular estimates and poor power of related tests. The singularity of the sample covariance matrix in high dimensions can be overcome by considering a linear combination with a regular, more structured target matrix. This approach is known as shrinkage, and the target matrix is typically of diagonal form. In this paper, we consider covariance shrinkage towards structured nonparametric estimators of the bandable or Toeplitz type, respectively, aiming at improved estimation accuracy and statistical power of tests even under nonstationarity. We derive feasible Gaussian approximation results for bilinear projections of the shrinkage estimators which are valid under nonstationarity and dependence. These approximations especially enable us to formulate a statistical test for structural breaks in the marginal covariance structure of high-dimensional time series without restrictions on the dimension, and which is robust against nonstationarity of nuisance parameters. We show via simulations that shrinkage helps to increase the power of the proposed tests. Moreover, we suggest a data-driven choice of the shrinkage weights, and assess its performance by means of a Monte Carlo study. The results indicate that the proposed shrinkage estimator is superior for non-Toeplitz covariance structures close to fractional Gaussian noise. 

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