Degree 6 hyperbolic polynomials and orders of moduli

Abstract

We consider real univariate degree d real-rooted polynomials with non-vanishing coefficients. Descartes' rule of signs implies that such a polynomial has c positive and p negative roots counted with multiplicity, where c and p are the numbers of sign changes and sign preservations in the sequence of its coefficients, c+p=d. For d=6, we give the exhaustive answer to the question: When the moduli of all 6 roots are distinct and arranged on the real positive half-axis, in which positions can the moduli of the negative roots be depending on the signs of the coefficients?

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