Geodesic
Inflectional Convex Space Curves
Canadian journal of mathematics, Tome 36 (1984) no. 3, pp. 537-549

Voir la notice de l'article provenant de la source Cambridge University Press

Let Φ be a regular closed C 2 curve on a sphere S in Euclidean three-space. Let H(S)[H(Φ) ] denote the convex hull of S[Φ]. For any point p ∈ H(S), let O(p) be the set of points of Φ whose osculating plane at each of these points passes through p.1. THEOREM ([8]). If Φ has no multiple points and p ∈ H(Φ), then |0(p) | ≧ 3[4] when p is [is not] a vertex of Φ.2. THEOREM ( [9]). a) If the only self intersection point of Φ is a doublepoint and p ∈ H(Φ) is not a vertex of Φ, then |O(p)| ≧ 2.b) Let Φ possess exactly n vertices. Then (1) |O(p)| ≦ n for p ∈ H(S) and (2) if the osculating plane at each vertex of Φ meets Φ at exactly one point, |O(p)| = n if and only if p ∈ H(Φ) is not vertex. 
Bisztriczky, Tibor. Inflectional Convex Space Curves. Canadian journal of mathematics, Tome 36 (1984) no. 3, pp. 537-549. doi: 10.4153/CJM-1984-033-7
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