Wronskians, total positivity, and real Schubert calculus

Abstract

A complete flag in Rn is a sequence of nested subspaces V1 ⊂ ·s ⊂ Vn-1 such that each Vk has dimension k. It is called totally nonnegative if all its Pl\"ucker coordinates are nonnegative. We may view each Vk as a subspace of polynomials in R[x] of degree at most n-1, by associating a vector (a1, …, an) in Rn to the polynomial a1 + a2x + ·s + anxn-1. We show that a complete flag is totally nonnegative if and only if each of its Wronskian polynomials Wr(Vk) is nonzero on the interval (0, ∞). In the language of Chebyshev systems, this means that the flag forms a Markov system or ECT-system on (0, ∞). This gives a new characterization and membership test for the totally nonnegative flag variety. Similarly, we show that a complete flag is totally positive if and only if each Wr(Vk) is nonzero on [0, ∞]. We use these results to show that a conjecture of Eremenko (2015) in real Schubert calculus is equivalent to the following conjecture: if V is a finite-dimensional subspace of polynomials such that all complex zeros of Wr(V) lie in the interval (-∞, 0), then all Pl\"ucker coordinates of V are real and positive. This conjecture is a totally positive strengthening of a result of Mukhin, Tarasov, and Varchenko (2009), and can be reformulated as saying that all complex solutions to a certain family of Schubert problems in the Grassmannian are real and totally positive. We also show that our conjecture is equivalent to a totally positive version of the secant conjecture of Sottile (2003).

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