An explicit link between graphical models and Gaussian Markov random fields on metric graphs
Probability
2025-01-08 v1 Statistics Theory
Statistics Theory
Abstract
We derive an explicit link between Gaussian Markov random fields on metric graphs and graphical models, and in particular show that a Markov random field restricted to the vertices of the graph is, under mild regularity conditions, a Gaussian graphical model with a distribution which is faithful to its pairwise independence graph, which coincides with the neighbor structure of the metric graph. This is used to show that there are no Gaussian random fields on general metric graphs which are both Markov and isotropic in some suitably regular metric on the graph, such as the geodesic or resistance metrics.
Cite
@article{arxiv.2501.03701,
title = {An explicit link between graphical models and Gaussian Markov random fields on metric graphs},
author = {David Bolin and Alexandre B. Simas and Jonas Wallin},
journal= {arXiv preprint arXiv:2501.03701},
year = {2025}
}
Comments
28 pages, 3 figures