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- Harborths_conjecture abstract "In mathematics, Harborth's conjecture states that every planar graph has a planar drawing in which all edge lengths are integers. This conjecture is named after Heiko Harborth, and (if true) would strengthen Fáry's theorem on the existence of straight-line drawings for every planar graph. For this reason, a drawing with integer edge lengths is also known as an integral Fáry embedding. Despite much subsequent research, Harborth's conjecture remains unsolved.".
- Harborths_conjecture thumbnail Integer_octahedral_graph.svg?width=300.
- Harborths_conjecture wikiPageID "44342842".
- Harborths_conjecture wikiPageLength "8727".
- Harborths_conjecture wikiPageOutDegree "32".
- Harborths_conjecture wikiPageRevisionID "656915993".
- Harborths_conjecture wikiPageWikiLink Apollonian_network.
- Harborths_conjecture wikiPageWikiLink Bipartite_graph.
- Harborths_conjecture wikiPageWikiLink Category:Arithmetic_problems_of_plane_geometry.
- Harborths_conjecture wikiPageWikiLink Category:Conjectures.
- Harborths_conjecture wikiPageWikiLink Category:Planar_graphs.
- Harborths_conjecture wikiPageWikiLink Cubic_graph.
- Harborths_conjecture wikiPageWikiLink Dense_graph.
- Harborths_conjecture wikiPageWikiLink Dense_set.
- Harborths_conjecture wikiPageWikiLink Diamond_graph.
- Harborths_conjecture wikiPageWikiLink Erdős–Anning_theorem.
- Harborths_conjecture wikiPageWikiLink Erdős–Diophantine_graph.
- Harborths_conjecture wikiPageWikiLink Euler_brick.
- Harborths_conjecture wikiPageWikiLink Fxc3xa1rys_theorem.
- Harborths_conjecture wikiPageWikiLink Graph_drawing.
- Harborths_conjecture wikiPageWikiLink Heiko_Harborth.
- Harborths_conjecture wikiPageWikiLink Integer.
- Harborths_conjecture wikiPageWikiLink Integer_triangle.
- Harborths_conjecture wikiPageWikiLink K-edge-connected_graph.
- Harborths_conjecture wikiPageWikiLink Matchstick_graph.
- Harborths_conjecture wikiPageWikiLink Mathematics.
- Harborths_conjecture wikiPageWikiLink Null_graph.
- Harborths_conjecture wikiPageWikiLink Outerplanar_graph.
- Harborths_conjecture wikiPageWikiLink Planar_graph.
- Harborths_conjecture wikiPageWikiLink Platonic_solid.
- Harborths_conjecture wikiPageWikiLink Rational_number.
- Harborths_conjecture wikiPageWikiLink Series-parallel_graph.
- Harborths_conjecture wikiPageWikiLink Stanislaw_Ulam.
- Harborths_conjecture wikiPageWikiLink Treewidth.
- Harborths_conjecture wikiPageWikiLink Triangle_graph.
- Harborths_conjecture wikiPageWikiLink Unit_circle.
- Harborths_conjecture wikiPageWikiLink Universal_point_set.
- Harborths_conjecture wikiPageWikiLink File:Integer_octahedral_graph.svg.
- Harborths_conjecture wikiPageWikiLinkText "Harborth's conjecture".
- Harborths_conjecture wikiPageUsesTemplate Template:Harvtxt.
- Harborths_conjecture wikiPageUsesTemplate Template:Reflist.
- Harborths_conjecture wikiPageUsesTemplate Template:Unsolved.
- Harborths_conjecture subject Category:Arithmetic_problems_of_plane_geometry.
- Harborths_conjecture subject Category:Conjectures.
- Harborths_conjecture subject Category:Planar_graphs.
- Harborths_conjecture hypernym Integers.
- Harborths_conjecture comment "In mathematics, Harborth's conjecture states that every planar graph has a planar drawing in which all edge lengths are integers. This conjecture is named after Heiko Harborth, and (if true) would strengthen Fáry's theorem on the existence of straight-line drawings for every planar graph. For this reason, a drawing with integer edge lengths is also known as an integral Fáry embedding. Despite much subsequent research, Harborth's conjecture remains unsolved.".
- Harborths_conjecture label "Harborth's conjecture".
- Harborths_conjecture sameAs Q21002406.
- Harborths_conjecture sameAs m.012965dw.
- Harborths_conjecture sameAs Q21002406.
- Harborths_conjecture wasDerivedFrom Harborths_conjecture?oldid=656915993.
- Harborths_conjecture depiction Integer_octahedral_graph.svg.
- Harborths_conjecture isPrimaryTopicOf Harborths_conjecture.