result in geometry
C10469
concept
A result in geometry is a proven statement or theorem that describes a specific property, relationship, or behavior of geometric figures and spaces.
All labels observed (12)
| Label | Occurrences |
|---|---|
| result in convex geometry | 4 |
| result in geometric analysis | 3 |
| result in complex geometry | 2 |
| geometric analysis result | 1 |
| result in Euclidean geometry | 1 |
| result in Kähler geometry | 1 |
| result in geometry canonical | 1 |
| result in incidence geometry | 1 |
| result in projective geometry | 1 |
| result in set-theoretic geometry | 1 |
| result in the geometry of numbers | 1 |
| result in triangle geometry | 1 |
Instances (17)
| Instance | Via concept surface |
|---|---|
| Hamilton’s maximum principle | result in geometric analysis |
| Hamilton’s compactness theorem | result in geometric analysis |
| Conway circle theorem | result in triangle geometry |
| Banach–Tarski paradox | result in set-theoretic geometry |
| Thales’ theorem | result in Euclidean geometry |
| Helly’s theorem | result in convex geometry |
| Radon’s theorem | result in convex geometry |
| Minkowski’s theorem on convex sets | result in the geometry of numbers |
| Euler’s polyhedron formula | — |
| Kähler identities | result in complex geometry |
| Sylvester–Gallai theorem | result in incidence geometry |
| Gale’s theorem on linear inequalities | result in convex geometry |
| Blaschke selection theorem | result in convex geometry |
| Serre’s theorem on projective embeddings via ample line bundles | result in projective geometry |
| Hamilton’s compactness theorem for Ricci flow | result in geometric analysis |
| Hamilton’s Harnack inequalities for Ricci flow | geometric analysis result |
| Noether’s formula | result in complex geometry |