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Variable selection in linear-circular regression models

Author

Listed:
  • Onur Camli
  • Zeynep Kalaylioglu
  • Ashis SenGupta

Abstract

Applications of circular regression models are ubiquitous in many disciplines, particularly in meteorology, biology and geology. In circular regression models, variable selection problem continues to be a remarkable open question. In this paper, we address variable selection in linear-circular regression models where uni-variate linear dependent and a mixed set of circular and linear independent variables constitute the data set. We consider Bayesian lasso which is a popular choice for variable selection in classical linear regression models. We show that Bayesian lasso in linear-circular regression models is not able to produce robust inference as the coefficient estimates are sensitive to the choice of hyper-prior setting for the tuning parameter. To eradicate the problem, we propose a robustified Bayesian lasso that is based on an empirical Bayes (EB) type methodology to construct a hyper-prior for the tuning parameter while using Gibbs Sampling. This hyper-prior construction is computationally more feasible than the hyper-priors that are based on correlation measures. We show in a comprehensive simulation study that Bayesian lasso with EB-GS hyper-prior leads to a more robust inference. Overall, the method offers an efficient Bayesian lasso for variable selection in linear-circular regression while reducing model complexity.

Suggested Citation

  • Onur Camli & Zeynep Kalaylioglu & Ashis SenGupta, 2023. "Variable selection in linear-circular regression models," Journal of Applied Statistics, Taylor & Francis Journals, vol. 50(16), pages 3337-3361, December.
  • Handle: RePEc:taf:japsta:v:50:y:2023:i:16:p:3337-3361
    DOI: 10.1080/02664763.2022.2110860
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