English

Log-concave density estimation in undirected graphical models

Statistics Theory 2025-12-02 v1 Computation Methodology Machine Learning Statistics Theory

Abstract

We study the problem of maximum likelihood estimation of densities that are log-concave and lie in the graphical model corresponding to a given undirected graph GG. We show that the maximum likelihood estimate (MLE) is the product of the exponentials of several tent functions, one for each maximal clique of GG. While the set of log-concave densities in a graphical model is infinite-dimensional, our results imply that the MLE can be found by solving a finite-dimensional convex optimization problem. We provide an implementation and a few examples. Furthermore, we show that the MLE exists and is unique with probability 1 as long as the number of sample points is larger than the size of the largest clique of GG when GG is chordal. We show that the MLE is consistent when the graph GG is a disjoint union of cliques. Finally, we discuss the conditions under which a log-concave density in the graphical model of GG has a log-concave factorization according to GG.

Keywords

Cite

@article{arxiv.2206.05227,
  title  = {Log-concave density estimation in undirected graphical models},
  author = {Kaie Kubjas and Olga Kuznetsova and Elina Robeva and Pardis Semnani and Luca Sodomaco},
  journal= {arXiv preprint arXiv:2206.05227},
  year   = {2025}
}

Comments

45 pages (appendix at page 26), 13 figures, 5 tables

R2 v1 2026-06-24T11:46:53.049Z