A differential-geometrical criterion for quadratic Veronese embeddings

摘要

We obtain a criterion for quadratic Veronese varieties. We prove that in the set of smooth n-dimensional submanifolds of the projective space P~N of dimension N = n(n + 3)/2 only the Veronese varieties have the following two properties: (i) the tangent projective spaces at any two points intersect in a point, (ii) the osculating projective space at every point coincides with the ambient space. This result is a generalization to arbitrary n of the criterion for two-dimensional Veronese surfaces in P~5 proved by Griffiths and Harris. We also find a criterion for a pair of submanifolds of P~N to be contained in the same Veronese variety. We obtain calculation formulae that enable one to use these criteria in practice.