Positivity and universal Pl\"ucker coordinates for spaces of quasi-exponentials
Abstract
A quasi-exponential is an entire function of the form ecup(u), where p(u) is a polynomial and c ∈ C. Let V = eh1up1(u), …, ehNupN(u) be a vector space with a basis of quasi-exponentials. We show that if h1, …, hN are nonnegative and all of the complex zeros of the Wronskian Wr(V) are real, then V is totally nonnegative in the sense that all of its Grassmann-Pl\"ucker coordinates defined by the Taylor expansion about u=t are nonnegative, for any real t greater than all of the zeros of Wr(V). Our proof proceeds by showing that the higher Gaudin Hamiltonians TλG(t) introduced in [ALTZ14] are universal Pl\"ucker coordinates about u=t for the Wronski map on spaces of quasi-exponentials. The result that V is totally nonnegative follows from the fact that TλG(t) is positive semidefinite, which we establish using partial traces. We also show that if h1 = ·s = hN = 0 then TλG(t) equals βλ(t), which is the universal Pl\"ucker coordinate for the Wronski map on spaces of polynomials introduced in [KP23].
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