We construct noncompact solutions to the affine normal flow of hypersurfaces, and show that all ancient solutions must be either ellipsoids (shrinking solitons) or paraboloids (translating solitons). We also provide a new proof of the existence of a hyperbolic affine sphere asymptotic to the boundary of a convex cone containing no lines, which is originally due to Cheng-Yau. The main techniques are local second-derivative estimates for a parabolic Monge-Ampère equation modeled on those of Ben Andrews and Gutiérrez-Huang, a decay estimate for the cubic form under the affine normal flow due to Ben Andrews, and a hypersurface barrier due to Calabi.

Publié le : 2008-01-15
Classification: 

@article{1197320604,
     author = {Loftin, John and Tsui, Mao-Pei},
     title = {Ancient solutions of the affine normal flow},
     journal = {J. Differential Geom.},
     volume = {78},
     number = {1},
     year = {2008},
     pages = { 113-162},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1197320604}
}

Loftin, John; Tsui, Mao-Pei. Ancient solutions of the affine normal flow. J. Differential Geom., Tome 78 (2008) no. 1, pp.  113-162. http://gdmltest.u-ga.fr/item/1197320604/