PROXIMITY GRAPHS: E, δ, Δ, χ AND ω
From MaRDI portal
Publication:5300005
DOI10.1142/S0218195912500112zbMath1267.05072OpenAlexW2044795021MaRDI QIDQ5300005
Ferran Hurtado, Maria Saumell, David R. Wood, Vida Dujmović, Vera Sacristán, Stefan Langerman, Prosenjit Bose, John Iacono, Henk G. Meijer
Publication date: 24 June 2013
Published in: International Journal of Computational Geometry & Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218195912500112
Related Items
Graph product structure for non-minor-closed classes, Computational complexity of the vertex cover problem in the class of planar triangulations, 10-Gabriel graphs are Hamiltonian
Cites Work
- On crossing numbers of geometric proximity graphs
- Toughness and Delaunay triangulations
- On the average length of Delaunay triangulations
- The expected size of some graphs in computational geometry
- A non-Hamiltonian, nondegenerate Delaunay triangulation
- Some extremal results on circles containing points
- The relative neighbourhood graph of a finite planar set
- Solving the Euclidean bottleneck matching problem by \(k\)-relative neighborhood graphs
- Transitions in geometric minimum spanning trees
- Solving the Euclidean bottleneck biconnected edge subgraph problem by 2- relative neighborhood graphs
- Circles through two points that always enclose many points
- On nearest-neighbor graphs
- On circles containing the maximum number of points
- On the homogeneous planar Poisson point process
- THE EXPECTED EXTREMES IN A DELAUNAY TRIANGULATION
- ON STRUCTURAL AND GRAPH THEORETIC PROPERTIES OF HIGHER ORDER DELAUNAY GRAPHS
- On the expected maximum degree of Gabriel and Yao graphs
- Some properties of the planar Euclidean relative neighbourhood graph
- 20‐relative neighborhood graphs are hamiltonian
