Sign patterns and rigid moduli orders

Abstract

We consider the set of monic degree d real univariate polynomials Qd=xd+Σj=0d-1ajxj and its hyperbolicity domain d, i.e. the subset of values of the coefficients aj for which the polynomial Qd has all roots real. The subset Ed⊂ d is the one on which a modulus of a negative root of Qd is equal to a positive root of Qd. At a point, where Qd has d distinct roots with exactly s (1≤ s≤ [d/2]) equalities between positive roots and moduli of negative roots, the set Ed is locally the transversal intersection of s smooth hypersurfaces. At a point, where Qd has two double opposite roots and no other equalities between moduli of roots, the set Ed is locally the direct product of Rd-3 and a hypersurface in R3 having a Whitney umbrella singularity. For d≤ 4, we draw pictures of the sets d and~Ed.