Shapiro Conjecture : No Ramification ?

No Ramification ?

For the case of the Shaprio Conjecture pertaining to rational functions, Eremenko and Gabrielov have a new and elementary proof whose main ingredient that the Wronski map W : Gr(2, m+2) ----> P^2m , is unrammified over the set of polynomials of degree 2m with 2m distinct real roots.

We expect ramification of the Wronski map over polynomials with multiple roots. Other ramification points are polynomials F(t) of degree mp with distinct roots s₁, s₂, ..., s_mp where the system of equations

(*)

det

G(s_i )

= 0

for each i = 1,...,mp

on points H of the Grassmannian has a solution with multiplicity.

The asymptotic result mentioned previously showed that when the roots s_i are sufficiently clustered, then there are no multiple solutions to the equations (*).

In the experimentation, no multiple solutions were encountered in any instance of these equations (*) or in the equations for general incidence conditions, when all roots s_i were real.