The D-plus Discriminant and Complexity of Root Clustering

Abstract

Let p(x) be an integer polynomial with m 2 distinct roots 1,…,m whose multiplicities are μ=(μ1,…,μm). We define the D-plus discriminant of p(x) to be D+(p):= Π1 i<j m(i-j)μi+μj. We first prove a conjecture that D+(p) is a μ-symmetric function of its roots 1,…,m. Our main result gives an explicit formula for D+(p), as a rational function of its coefficients. Our proof is ideal-theoretic, based on re-casting the classic Poisson resultant as the "symbolic Poisson formula". The D-plus discriminant first arose in the complexity analysis of a root clustering algorithm from Becker et al. (ISSAC 2016). The bit-complexity of this algorithm is proportional to a quantity (|D+(p)|-1). As an application of our main result, we give an explicit upper bound on this quantity in terms of the degree of p and its leading coefficient.