Likelihood Geometry of Correlation Models
Statistics Theory
2021-02-02 v2 Algebraic Geometry
Optimization and Control
Statistics Theory
Abstract
Correlation matrices are standardized covariance matrices. They form an affine space of symmetric matrices defined by setting the diagonal entries to one. We study the geometry of maximum likelihood estimation for this model and linear submodels that encode additional symmetries. We also consider the problem of minimizing two closely related functions of the covariance matrix: the Stein's loss and the symmetrized Stein's loss. Unlike the Gaussian log-likelihood these two functions are convex and hence admit a unique positive definite optimum. Some of our results hold for general affine covariance models.
Cite
@article{arxiv.2012.03903,
title = {Likelihood Geometry of Correlation Models},
author = {Carlos Améndola and Piotr Zwiernik},
journal= {arXiv preprint arXiv:2012.03903},
year = {2021}
}
Comments
24 pages, 5 figures