Arguments of zeros of highly log concave polynomials

Abstract

For a real polynomial p = Σi=0n cixi with no negative coefficients and n≥ 6, let β (p) = ∈fi=1n-1 ci2/ci+1ci-1 (so β (p) ≥ 1 entails that p is log concave). If β(p) > 1.45..., then all roots of p are in the left half plane, and moreover, there is a function β0 (θ) (for π/2 ≤ θ ≤ π) β ≥ β0(θ) entails all roots of p have arguments in the sector | z| ≥ θ with the smallest possible θ; we determine exactly what this function (and its inverse) is (it turns out to be piecewise smooth, and quite tractible). This is a one-parameter extension of Kurtz's theorem (which asserts that β ≥ 4 entails all roots are real). We also prove a version of Kurtz's theorem with real (not necessarily nonnegative) coefficients.