On the Edges of Characteristic Imset Polytopes

Abstract

The edges of the characteristic imset polytope, CIMp, were recently shown to have strong connections to causal discovery as many algorithms could be interpreted as greedy restricted edge-walks, even though only a strict subset of the edges are known. To better understand the general edge structure of the polytope we describe the edge structure of faces with a clear combinatorial interpretation: for any undirected graph G we have the face CIMG, the convex hull of the characteristic imsets of DAGs with skeleton G. We give a full edge-description of CIMG when G is a tree, leading to interesting connections to other polytopes. In particular the well-studied stable set polytope can be recovered as a face of CIMG when G is a tree. Building on this connection we are also able to give a description of all edges of CIMG when G is a cycle, suggesting possible inroads for generalization. We then introduce an algorithm for learning directed trees from data, utilizing our newly discovered edges, that outperforms classical methods on simulated Gaussian data.