On Descartes' rule of signs

Abstract

A sequence of d+1 signs + and - beginning with a + is called a sign pattern (SP). We say that the real polynomial P:=xd+Σ j=0d-1ajxj, aj≠ 0, defines the SP σ :=(+,sgn(ad-1), …, sgn(a0)). By Descartes' rule of signs, for the quantity pos of positive (resp. neg of negative) roots of P, one has pos≤ c (resp. neg≤ p=d-c), where c and p are the numbers of sign changes and sign preservations in σ; the numbers c-pos and p-neg are even. We say that P realizes the SP σ with the pair (pos, neg). For SPs with c=2, we give some sufficient conditions for the (non)realizability of pairs (pos, neg) of the form (0,d-2k), k=1, …, [(d-2)/2].