Coarsening polyhedral complexes
Abstract
Given a pure, full-dimensional, locally strongly connected polyhedral complex C with convex support, we characterize, by a local codimension-2 condition, polyhedral complexes that coarsen C. The proof of the characterization draws upon a surprising general shortcut for showing that a collection of polyhedra is a polyhedral complex and upon a property of hyperplane arrangements which is equivalent, for Coxeter arrangements, to Tits' solution to the Word Problem. The motivating special case, the case where C is a complete fan, generalizes a result of Morton, Pachter, Shiu, Sturmfels, and Wienand that equates convex rank tests with semigraphoids. The proof of the main result also implies a special case of Tietze's convexity theorem. We also prove oriented matroid versions of our results, obtaining, as a byproduct, an oriented matroid version of Tietze's convexity theorem.
Keywords
Cite
@article{arxiv.1004.4194,
title = {Coarsening polyhedral complexes},
author = {Nathan Reading},
journal= {arXiv preprint arXiv:1004.4194},
year = {2026}
}
Comments
13 pages. Version 2: Belatedly bringing the arXiv version into agreement with the pre-publication manuscript