Explicit zero-free regions and a τ-Li-type criterion

Abstract

τ-Li coefficients describe if a function satisfies the Generalized Riemann Hypothesis or not. In this paper we prove that certain values of the τ-Li coefficients lead to existence or non-existence of certain zeros. The first main result gives explicit numbers N1 and N2 such that if all real parts of the τ-Li coefficients are non-negative for all indices between N1 and N2, then the function has non zeros outside a certain region. According to the second result, if some of the real parts of the τ-Li coefficients are negative for some index n between numbers n1 and n2, then there is at least one zero outside a certain region.