Zeros of polynomials of derivatives of zeta functions

Abstract

Let Ps ∈ Ds[X0,X1, …,Xl] be a polynomial whose coefficients are the ring of all general Dirichlet series which converge absolutely in the half-plane (s) > 1/2. In the present paper, we show that the function Ps(L(s), L(1)(s),…, L(l)(s)) has infinitely many zeros in the vertical strip D:= \ s ∈ C : 1/2 < (s) <1\ if L(s) is hybridly universal and Ps ∈ Ds[X0,X1, …,Xl] is a polynomial such that at least one of the degree of X1,…,Xl is greater than zero. As a corollary, we prove that the function (dk / dsk) Ps(L(s)) with k ∈ N has infinitely many zeros in the strip D when L(s) is hybridly universal and Ps ∈ Ds[X] is a polynomial with degree greater than zero. The upper bounds for the numbers of zeros of Ps(L(s), L(1)(s),…, L(l)(s)) and (dk / dsk) Ps(L(s)) are studied as well.