A simplification of the proof of Bol's conjecture on sextactic points
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Publication:542526
DOI10.3792/pjaa.87.10zbMath1232.53020OpenAlexW2094787819WikidataQ123179207 ScholiaQ123179207MaRDI QIDQ542526
Publication date: 10 June 2011
Published in: Proceedings of the Japan Academy. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3792/pjaa.87.10
Curves in Euclidean and related spaces (53A04) Projective differential geometry (53A20) Geometric orders, order geometry (53C75)
Related Items (3)
Kosambi–Cartan–Chern Analysis of the Nonequilibrium Singular Point in One-Dimensional Elementary Catastrophe ⋮ The behavior of curvature functions at cusps and inflection points ⋮ Equi-affine plane curves with singular points
Cites Work
- The minimum number of points of inflexion of closed curves in the projective plane
- Inflection points and double tangents on anti-convex curves in the real projective plane
- Affine-invariant distances, envelopes and symmetry sets
- On a conjecture of G. Bol.
- Generic affine differential geometry of plane curves
- Sextactic points on a simple closed curve
- A global theory of flexes of periodic functions
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