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Covariance Matrix Estimation via Network Structure

Author

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  • Wei Lan
  • Zheng Fang
  • Hansheng Wang
  • Chih-Ling Tsai

Abstract

In this article, we employ a regression formulation to estimate the high-dimensional covariance matrix for a given network structure. Using prior information contained in the network relationships, we model the covariance as a polynomial function of the symmetric adjacency matrix. Accordingly, the problem of estimating a high-dimensional covariance matrix is converted to one of estimating low dimensional coefficients of the polynomial regression function, which we can accomplish using ordinary least squares or maximum likelihood. The resulting covariance matrix estimator based on the maximum likelihood approach is guaranteed to be positive definite even in finite samples. Under mild conditions, we obtain the theoretical properties of the resulting estimators. A Bayesian information criterion is also developed to select the order of the polynomial function. Simulation studies and empirical examples illustrate the usefulness of the proposed methods.

Suggested Citation

  • Wei Lan & Zheng Fang & Hansheng Wang & Chih-Ling Tsai, 2018. "Covariance Matrix Estimation via Network Structure," Journal of Business & Economic Statistics, Taylor & Francis Journals, vol. 36(2), pages 359-369, April.
    • Handle: RePEc:taf:jnlbes:v:36:y:2018:i:2:p:359-369
    DOI: 10.1080/07350015.2016.1173558
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    Citations

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    Cited by:

    1. Jin Yuan & Xianghui Yuan, 2023. "A Best Linear Empirical Bayes Method for High-Dimensional Covariance Matrix Estimation," SAGE Open, , vol. 13(2), pages 21582440231, June.
    2. Zou, Tao & Lan, Wei & Li, Runze & Tsai, Chih-Ling, 2022. "Inference on covariance-mean regression," Journal of Econometrics, Elsevier, vol. 230(2), pages 318-338.
    3. Canfield, Martha & Norton, Sam & Downs, Johnny & PMM Wijlaars, Linda & Gilchrist, Gail, 2023. "Risk factors for involvement in care proceedings for mothers receiving treatment for substance use: A cohort study using linked and administrative data in South London," Children and Youth Services Review, Elsevier, vol. 155(C).
    4. Li Guo & Wolfgang Karl Hardle & Yubo Tao, 2018. "A Time-Varying Network for Cryptocurrencies," Papers 1802.03708, arXiv.org, revised Nov 2022.
    5. Ma, Yingying & Lan, Wei & Zhou, Fanying & Wang, Hansheng, 2020. "Approximate least squares estimation for spatial autoregressive models with covariates," Computational Statistics & Data Analysis, Elsevier, vol. 143(C).

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