Real k-flats tangent to quadrics in Rn
Abstract
Let dk,n and #k,n denote the dimension and the degree of the Grassmannian Gk,n of k-planes in projective n-space, respectively. For each k between 1 and n-2 there are 2dk,n · #k,n (a priori complex) k-planes in Pn tangent to dk,n general quadratic hypersurfaces in Pn. We show that this class of enumerative problem is fully real, i.e., for each k between 1 and n-2 there exists a configuration of dk,n real quadrics in (affine) real space Rn so that all the mutually tangent k-flats are real.
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