The conjecture of Shapiro and Shapiro for general Schubert conditions

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3.ii. The conjecture of Shapiro and Shapiro

The conjecture of Shapiro and Shapiro makes sense in the wider context of general Schubert conditions. Given a point s on a real rational normal curve, we can consider the flag of subspaces F.(s) osculating the curve at s. A practical way to generate such flag of subspaces is to begin with a parameterization of a real rational normal curve as a row vector, and then let F_i(s) be the linear span of this vector and its first i-1 derivatives with respect to the parameter.

Conjecture 2. (Shapiro-Shapiro)
Suppose that a¹, a², ..., aⁿ are Schubert data (|a¹| + |a²| + ... + |aⁿ| = mp) and s₁, s₂, ..., s_n are general distinct real numbers, then each of the finitely many p-planes H satisfying the Schubert conditions aⁱ with respect to the flags F.(s_i) are real.

Equivalently, the common intersection of the Schubert varieties

Y_a¹F.¹, Y_a²F.², ..., Y_aⁿF.ⁿ,
consists solely of real p-planes H.