A tropical analog of Descartes' rule of signs

Abstract

We prove that for any degree d, there exist (families of) finite sequences a0, a1,..., ad of positive numbers such that, for any real polynomial P of degree d, the number of its real roots is less than or equal to the number of the so-called essential tropical roots of the polynomial obtained from P by multiplication of its coefficients by a0, a1,... ad respectively. In particular, for any real univariate polynomial P of degree d with non-vanishing constant term, we conjecture that one can take ak = e-k2, k = 0, ... , d. The latter claim can be thought of as a tropical generalization of Descartes's rule of signs. We settle this conjecture up to degree 4 as well as a weaker statement for arbitrary real polynomials. Additionally we describe an application of the latter conjecture to the classical Karlin problem on zero-diminishing sequences.