Further than Descartes' rule of signs

Abstract

The sign pattern defined by the real polynomial Q:= j=0dajxj, aj≠ 0, is the string σ (Q):=( sgn(ad ),… , sgn(a0 )). The quantities pos and neg of positive and negative roots of Q satisfy Descartes' rule of signs. A couple (σ 0,(pos,neg)), where σ 0 is a sign pattern of length d+1, is realizable if there exists a polynomial Q with pos positive and neg negative simple roots, with (d-pos-neg)/2 complex conjugate pairs and with σ (Q)=σ0. We present a series of couples (sign pattern, pair (pos,neg)) depending on two integer parameters and with pos≥ 1, neg≥ 1, which is not realizable. For d=9, we give the exhaustive list of realizable couples with two sign changes in the sign pattern.