On generalized Heawood inequalities for manifolds: a van Kampen-Flores-type nonembeddability result
From MaRDI portal
Publication:1686405
DOI10.1007/s11856-017-1607-7zbMath1390.57012OpenAlexW2284131041WikidataQ105336435 ScholiaQ105336435MaRDI QIDQ1686405
Xavier Goaoc, Pavel Paták, Isaac Mabillard, Martin Tancer, Uli Wagner, Zuzana Safernová
Publication date: 22 December 2017
Published in: Israel Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11856-017-1607-7
General topology of complexes (57Q05) Planar graphs; geometric and topological aspects of graph theory (05C10) Relations of low-dimensional topology with graph theory (57M15)
Related Items
Generalized Heawood numbers ⋮ Embeddings of \(k\)-complexes into \(2k\)-manifolds ⋮ Topological Drawings Meet Classical Theorems from Convex Geometry
Cites Work
- The unique 3-neighborly 4-manifold with few vertices
- Kneser's conjecture, chromatic number, and homotopy
- The 9-vertex complex projective plane
- 15-vertex triangulations of an 8-manifold
- Every planar map is four colorable. I: Discharging
- Every planar map is four colorable. II: Reducibility
- On the van Kampen-Flores theorem
- A Generalized van Kampen-Flores Theorem
- On Spaces Having the Homotopy Type of a CW-Complex
- On Generalized Heawood Inequalities for Manifolds: a van Kampen--Flores-type Nonembeddability Result
- Using the Borsuk-Ulam theorem. Lectures on topological methods in combinatorics and geometry. Written in cooperation with Anders Björner and Günter M. Ziegler
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
