On affine hypersurfaces with everywhere nondegenerate Second Quadratic Form

Abstract

Consider a closed connected hypersurface in Rn with constant signature (k,l) of the second quadratic form, and approaching a quadratic cone at infinity. This hypersurface divides Rn into two pieces. We prove that one of them contains a k-dimensional subspace, and another contains a l-dimensional subspace, thus proving an affine version of Arnold hypothesis. We construct an example of a surface of negative curvature in R3 with slightly different asymptotical behavior for which the previous claim is wrong.

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