Adjacency Graphs of Polyhedral Surfaces
Abstract
We study whether a given graph can be realized as an adjacency graph of the polygonal cells of a polyhedral surface in . We show that every graph is realizable as a polyhedral surface with arbitrary polygonal cells, and that this is not true if we require the cells to be convex. In particular, if the given graph contains , , or any nonplanar -tree as a subgraph, no such realization exists. On the other hand, all planar graphs, , and can be realized with convex cells. The same holds for any subdivision of any graph where each edge is subdivided at least once, and, by a result from McMullen et al. (1983), for any hypercube. Our results have implications on the maximum density of graphs describing polyhedral surfaces with convex cells: The realizability of hypercubes shows that the maximum number of edges over all realizable -vertex graphs is in . From the non-realizability of , we obtain that any realizable -vertex graph has edges. As such, these graphs can be considerably denser than planar graphs, but not arbitrarily dense.
Cite
@article{arxiv.2103.09803,
title = {Adjacency Graphs of Polyhedral Surfaces},
author = {Elena Arseneva and Linda Kleist and Boris Klemz and Maarten Löffler and André Schulz and Birgit Vogtenhuber and Alexander Wolff},
journal= {arXiv preprint arXiv:2103.09803},
year = {2025}
}
Comments
The conference version of this paper appeared in Proc. SoCG 2021