Intersections of Convex Hulls of Polynomial Shifts and Critical Points

Abstract

Let p(z) be a complex polynomial of degree n 2. For each c∈C, let Kc denote the convex hull of the zeros of p(z)+c, and let K' denote the convex hull of the zeros of p'(z). We prove that c∈C Kc = K', by combining a strict separating hyperplane argument with a half-plane non-surjectivity theorem for polynomials without critical points (proved via analytic continuation, the monodromy theorem and Liouville's Theorem). We also characterize when K0=K' in terms of the multiplicities of the zeros of p(z) that form the vertices of K0. As an application, we obtain a partial result toward the Schmeisser's conjecture: if all zeros of p lie in the closed unit disk, then for every ζ∈ K' the disk |z-ζ| 1-|ζ|2 contains a critical point of p(z). Finally, we refine a recent barycentric bound in Zha26+ by showing that there is always a critical point within distance n-2n-11-|G|2 of the centroid G of the zeros.