Coarse geometry of quasi-transitive graphs beyond planarity (2312.08902v6)
Abstract: We study geometric and topological properties of infinite graphs that are quasi-isometric to a planar graph of bounded degree. We prove that every locally finite quasi-transitive graph excluding a minor is quasi-isometric to a planar graph of bounded degree. We use the result to give a simple proof of the result that finitely generated minor-excluded groups have Assouad-Nagata dimension at most 2 (this is known to hold in greater generality, but all known proofs use significantly deeper tools). We also prove that every locally finite quasi-transitive graph that is quasi-isometric to a planar graph is $k$-planar for some $k$ (i.e. it has a planar drawing with at most $k$ crossings per edge), and discuss a possible approach to prove the converse statement.
- Patrice Assouad. Sur la distance de Nagata. Comptes Rendus de l’Académie des Sciences, Paris, Série I, 294:31–34, 1982.
- Surfaces have (asymptotic) dimension 2, 2020.
- Asymptotic dimension of minor-closed families and Assouad–Nagata dimension of surfaces. Journal of the European Mathematical Society, 2023.
- A Hurewicz theorem for the Assouad–Nagata dimension. Journal of the London Mathematical Society, 77(3):741–756, 2008.
- Hans L. Bodlaender. Planar graphs with bounded treewidth. Technical Report RUU-CS-88-14, Department of Computer Science, University of Utrecht, 1988.
- On the separation profile of infinite graphs. Groups Geom. Dyn., 6(4):639–658, 2012.
- Marc Distel. Proper minor-closed classes of graphs have Assouad-Nagata dimension 2. arXiv e-print 2308.10377, 2023.
- Graph product structure for non-minor-closed classes. Journal of Combinatorial Theory, Series B, 162:34–67, 2023.
- Some results on tree decomposition of graphs. Journal of Graph Theory, 20(4):481–499, 1995.
- The structure of quasi-transitive graphs avoiding a minor with applications to the domino problem. arXiv e-print 2304.01823, 2023.
- Graph minors and metric spaces. arXiv e-print 2305.07456, 2023.
- Mikhael Gromov. Geometric group theory. Volume 2: Asymptotic invariants of infinite groups. Proceedings of the symposium held at the Sussex University, Brighton, July 14-19, 1991, volume 182 of Lond. Math. Soc. Lect. Note Ser. Cambridge: Cambridge University Press, 1993.
- Dénes König. Über eine Schlußweise aus dem Endlichen ins Unendliche. Acta Litt. Sci. Szeged, 3:121–130, 1927.
- Chun-Hung Liu. Assouad-Nagata dimension of minor-closed metrics. arXiv e-print 2308.12273, 2023.
- Nagata dimension, quasisymmetric embeddings, and Lipschitz extensions. Int. Math. Res. Not., 2005(58):3625–3655, 2005.
- Joseph MacManus. Accessibility, planar graphs, and quasi-isometries. arXiv e-print 2310.15242, 2023.
- Metric dimensions of minor excluded graphs and minor exclusion in groups. International Journal of Algebra and Computation, 25(04):541–554, 2015.
- Graph minors. XVI. Excluding a non-planar graph. Journal of Combinatorial Theory, Series B, 89(1):43–76, 2003.
- Vertex-transitive graphs and accessibility. Journal of Combinatorial Theory, Series B, 58(2):248–268, 1993.
- Klaus Wagner. Über eine Eigenschaft der ebenen Komplexe. Math. Ann., 114:570–590, 1937.