English

Uncertainty Quantification in Bayesian Reduced-Rank Sparse Regressions

Methodology 2024-02-14 v2 Applications

Abstract

Reduced-rank regression recognises the possibility of a rank-deficient matrix of coefficients. We propose a novel Bayesian model for estimating the rank of the coefficient matrix, which obviates the need for post-processing steps and allows for uncertainty quantification. Our method employs a mixture prior on the regression coefficient matrix along with a global-local shrinkage prior on its low-rank decomposition. Then, we rely on the Signal Adaptive Variable Selector to perform sparsification and define two novel tools: the Posterior Inclusion Probability uncertainty index and the Relevance Index. The validity of the method is assessed in a simulation study, and then its advantages and usefulness are shown in real-data applications on the chemical composition of tobacco and on the photometry of galaxies.

Keywords

Cite

@article{arxiv.2306.01521,
  title  = {Uncertainty Quantification in Bayesian Reduced-Rank Sparse Regressions},
  author = {Maria F. Pintado and Matteo Iacopini and Luca Rossini and Alexander Y. Shestopaloff},
  journal= {arXiv preprint arXiv:2306.01521},
  year   = {2024}
}
R2 v1 2026-06-28T10:54:33.597Z