On the Pick invariant, the affine mean curvature and the Gauss curvature of affine surfaces
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Publication:1190279
DOI10.1007/BF03323199zbMath0765.53006OpenAlexW2017782796MaRDI QIDQ1190279
Publication date: 27 September 1992
Published in: Results in Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf03323199
Related Items (11)
On locally symmetric affine hypersurfaces ⋮ Canonical centroaffine hypersurfaces in \({\mathbb{R}{}}^{n+1}\) ⋮ Pick invariant and affine Gauss-Kronecker curvature ⋮ Ruled surfaces with constant terms in the relative theorema egregium ⋮ Invariants of surfaces in three-dimensional affine geometry ⋮ Affine complete locally convex hypersurfaces ⋮ Differential invariants of surfaces ⋮ An affine invariant characterization of flat gravity curves ⋮ New equiaffine characterizations of the ellipsoids related to an equiaffine integral inequality on hyperovaloids ⋮ Characterization of affine ruled surfaces ⋮ The classification of 3-dimensional locally strongly convex homogeneous affine hypersurfaces
Cites Work
- Conjugate connections and Radon's theorem in affine differential geometry
- Flat affine spheres in \(R^ 3\)
- Affine surfaces with constant affine curvatures
- Uniqueness theorems in affine differential geometry. II
- Local classification of twodimensional affine spheres with constant curvature metric
- Equivalence theorems in affine differential geometry
- Two results in the affine hypersurface theory
- Affine spheres with constant affine sectional curvature
- Affine 3-Spheres with Constant Affine Curvature
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