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General composite quantile regression: Theory and methods

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  • Yanke Wu
  • Maozai Tian
  • Man-Lai Tang

Abstract

In this article, we propose a new regression method called general composite quantile regression (GCQR) which releases the unrealistic finite error variance assumption being imposed by the traditional least squares (LS) method. Unlike the recently proposed composite quantile regression (CQR) method, our proposed GCQR allows any continuous non-uniform density/weight function. As a result, determination of the number of uniform quantile positions is not required. Most importantly, the proposed GCQR criterion can be readily transformed to a linear programing problem, which substantially reduces the computing time. Our theoretical and empirical results show that the GCQR is generally efficient than the CQR and LS if the weight function is appropriately chosen. The oracle properties of the penalized GCQR are also provided. Our simulation results are consistent with the derived theoretical findings. A real data example is analyzed to demonstrate our methodologies.

Suggested Citation

  • Yanke Wu & Maozai Tian & Man-Lai Tang, 2020. "General composite quantile regression: Theory and methods," Communications in Statistics - Theory and Methods, Taylor & Francis Journals, vol. 49(9), pages 2217-2236, May.
    • Handle: RePEc:taf:lstaxx:v:49:y:2020:i:9:p:2217-2236
    DOI: 10.1080/03610926.2019.1568493
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    Cited by:

    1. Yingying Hu & Huixia Judy Wang & Xuming He & Jianhua Guo, 2021. "Bayesian joint-quantile regression," Computational Statistics, Springer, vol. 36(3), pages 2033-2053, September.

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