Positivity in Linear Gaussian Structural Equation Models
Abstract
We study a notion of positivity of Gaussian directed acyclic graphical models corresponding to a non-negativity constraint on the coefficients of the associated structural equation model. We prove that this constraint is equivalent to the distribution being conditionally increasing in sequence (CIS), a well-known subclass of positively associated random variables. These distributions require knowledge of a permutation, a CIS ordering, of the nodes for which the constraint of non-negativity holds. We provide an algorithm and prove in the noise-less setting that a CIS ordering can be recovered when it exists. We extend this result to the noisy setting and provide assumptions for recovering the CIS orderings. In addition, we provide a characterization of Markov equivalence for CIS DAG models. Further, we show that when a CIS ordering is known, the corresponding class of Gaussians lies in a family of distributions in which maximum likelihood estimation is a convex problem.
Cite
@article{arxiv.2305.19884,
title = {Positivity in Linear Gaussian Structural Equation Models},
author = {Asad Lodhia and Jan-Christian Hütter and Caroline Uhler and Piotr Zwiernik},
journal= {arXiv preprint arXiv:2305.19884},
year = {2023}
}
Comments
22 pages, 5 figures