The existence of embeddings for which the Gauss map is an embedding

## Abstract We study the relationship between the generic smoothness of the Gauss map and the reflexivity (with respect to the projective dual) for a projective variety defined over an algebraically closed field. The problem we discuss here is whether it is possible for a projective variety __X__ i

Let f : M → R 2 be a smooth map of a closed n-dimensional manifold (n 2) into the plane and let π n+2 2 : R n+2 → R 2 be an orthogonal projection. We say that f has the standard lifting property, if every embedding f : M → R n+2 with π n+2 2 • f = f is standard in a certain sense. In this paper we g

In this paper we study geometric aspects of Riemannian manifolds for which the identity is an ε-equilibrium map for sufficiently small ε > 0. We mainly prove that compact connected Riemannian manifolds for which the identity is an ε-equilibrium map for sufficiently small ε > 0 are ball-homogeneous.