On 2-convex non-orientable surfaces in four-dimensional Euclidean space
Abstract
We prove that a 2-convex closed surface S⊂ E4 in the four-dimensional Euclidean space E4, which is either C2-smooth or polyhedral, provided that each vertex is incident to at most five edges, admits a mapping of degree one to a two-dimensional torus, where the degree is assumed to be 2 if S is nonorientable. As a corollary, we show that the projective plane and the Klein bottle do not admit such a 2-convex embedding in E4.
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