Avoidance Loci of Real Projective Varieties
Abstract
We study real linear spaces in projective space that avoid the real points of a non-degenerate projective variety. For a variety X ⊂ Pn-1 with a real smooth point, we define the avoidance locus Ak(X) as the subset of the real Grassmannian Gr(k,n)R consisting of linear spaces that meet X transversely but contain no real point of X. Our construction generalizes the cone of positive polynomials on Rn. We prove that the avoidance locus is an open semi-algebraic set equal to a union of regions in the complement of a higher Chow form, and that distinct regions are non-adjacent. We present explicit examples for linear spaces, curves, and surfaces, and provide bounds on the number of connected components of An-1(X) in terms of the topology of the real locus XR. Finally, we prove that avoidance loci are slice-convex.
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