On the sign of the real part of the Riemann zeta-function

Abstract

We consider the distribution of ζ(σ+it) on fixed lines σ> 12, and in particular the density \[d(σ) = T → +∞ 12T |\t ∈ [-T,+T]: |ζ(σ+it)| > π/2\|\,,\] and the closely related density \[d-(σ) = T → +∞ 12T |\t ∈ [-T,+T]: ζ(σ+it) < 0\|\,.\] Using classical results of Bohr and Jessen, we obtain an explicit expression for the characteristic function ψσ(x) associated with ζ(σ+it). We give explicit expressions for d(σ) and d-(σ) in terms of ψσ(x). Finally, we give a practical algorithm for evaluating these expressions to obtain accurate numerical values of d(σ) and d-(σ).