Geometry of Hypersurfaces Thomas E. Cecil, Patrick J. Ryan
Publisher: Springer New York
Internet Archive BookReader - Differential Geometry- Global Geometry of Differential Geometry- Global Geometry of Hypersurfaces. We give a conformal classification of affine-complete centroaffine Tchebychev hypersurfaces recently introduced by Liu and Wang. ABSTRACT Let be a space-like hypersurface without umbilical points in the Lorentz space form . THE M¨OBIUS GEOMETRY OF HYPERSURFACES. Global Affine Differential Geometry of Hypersurfaces. Series:De Gruyter Expositions in Mathematics 11. 1 A hypersurface patch is a smooth map f : U shape operator allows us to express it as a linear combination of these vec. THE M¨OBIUS GEOMETRY OF HYPERSURFACES, II. Li, An-Min / Simon, Udo / Zhao, Guosong. Local geometry of hypersurfaces. ON DIFFERENTIAL GEOMETRY OF HYPERSURFACES.