Real Rank Two Geometry
classification
🧮 math.AG
cs.CGmath.OC
keywords
realrankvarietyalgebraicboundarycharacterizationclosureconsists
read the original abstract
The real rank two locus of an algebraic variety is the closure of the union of all secant lines spanned by real points. We seek a semi-algebraic description of this set. Its algebraic boundary consists of the tangential variety and the edge variety. Our study of Segre and Veronese varieties yields a characterization of tensors of real rank two.
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