Hypersurfaces of constant Gauss-Kronecker curvature with Li-normalization in affine space

Abstract

For convex hypersurfaces in the affine space An+1 (n≥2), A.-M.\ Li introduced the notion of α-normal field as a generalization of the affine normal field. By studying a Monge-Amp\`ere equation with gradient blowup boundary condition, we show that regular domains in An+1, defined with respect to a proper convex cone and satisfying some regularity assumption if n≥3, are foliated by complete convex hypersurfaces with constant Gauss-Kronecker curvature relative to the Li-normalization. When n=2, a key feature is that no regularity assumption is required, and the result extends our recent work about the α=1 case.