Jensen Polynomials for the Riemann Xi Function

Abstract

We investigate Riemann's xi function (s):=12s(s-1)π-s2(s2)ζ(s) (here ζ(s) is the Riemann zeta function). The Riemann Hypothesis (RH) asserts that if (s)=0, then Re(s)=12. P\'olya proved that RH is equivalent to the hyperbolicity of the Jensen polynomials Jd,n(X) constructed from certain Taylor coefficients of (s). For each d≥ 1, recent work proves that Jd,n(X) is hyperbolic for sufficiently large n. Here we make this result effective. Moreover, we show how the low-lying zeros of the derivatives (n)(s) influence the hyperbolicity of Jd,n(X).