Algebraically Skew Embeddings of Curves
Abstract
Given a smooth complex variety X, an algebraically skew embedding of X is an embedding of X into a complex projective space PN such that for any two points x,y∈ X, their embedded tangent spaces in PN do not intersect. In this work, we establish an upper bound and a lower bound of the minimal dimension N such that there exists an algebraically skew embedding into PN in terms of the dimension of the given smooth variety X. Then we further classify the algebraic curves in terms of their minimal skew embedding dimensions, and apply the same technique to other one-parameter family of lines.
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