Bolyai– Lobachevsky geometry
GPTKB entity
Statements (63)
| Predicate | Object |
|---|---|
| gptkbp:instance_of |
gptkb:DJ
|
| gptkbp:bfsLayer |
5
|
| gptkbp:bfsParent |
gptkb:János_Bolyai
|
| gptkbp:applies_to |
gptkb:musician
gptkb:technology curved surfaces scientific modeling engineering designs architecture design |
| gptkbp:connects |
complex analysis
|
| gptkbp:developed_by |
gptkb:János_Bolyai
gptkb:Nikolai_Lobachevsky |
| gptkbp:has_programs |
gptkb:physicist
|
| https://www.w3.org/2000/01/rdf-schema#label |
Bolyai– Lobachevsky geometry
|
| gptkbp:influenced_by |
gptkb:Euclid's_Elements
|
| gptkbp:is_a |
gptkb:church
gptkb:government_agency gptkb:concept concept in mathematics geometric theory geometric framework |
| gptkbp:is_characterized_by |
hyperbolic distance
constant negative curvature triangles with angles summing to less than 180 degrees geodesics that diverge hyperbolic parallel postulate non-Euclidean properties |
| gptkbp:is_compared_to |
Euclidean geometry
|
| gptkbp:is_considered_as |
a model of space
|
| gptkbp:is_explored_in |
gptkb:physicist
gptkb:academic_research gptkb:educational_curricula interdisciplinary studies philosophy of mathematics mathematical research mathematical philosophy |
| gptkbp:is_fundamental_to |
gptkb:television_channel
|
| gptkbp:is_influenced_by |
philosophical implications of geometry
historical mathematicians cultural perspectives on mathematics historical developments in mathematics non-Euclidean thinkers |
| gptkbp:is_related_to |
gptkb:Company
differential geometry Riemannian geometry mathematical modeling mathematical logic mathematical proofs theoretical constructs |
| gptkbp:is_represented_in |
hyperbolic plane
|
| gptkbp:is_studied_in |
gptkb:Mathematician
advanced mathematics mathematical education geometry courses geometry research geometry theory |
| gptkbp:is_used_in |
gptkb:spacecraft
gptkb:artwork data visualization computer simulations navigation systems artistic representations scientific theories |