Large values of the argument of the Riemann zeta-function and its iterates

Abstract

Let S(σ,t)=1πζ(σ+it) be the argument of the Riemann zeta-function at the point σ+it in the critical strip. For n≥ 1 and t>0, we define equation* Sn(σ,t) = ∫0t Sn-1(σ,τ) \,dτ + δn,σ\,, equation* where δn,σ is a specific constant depending on σ and n. Let 0≤ β<1 be a fixed real number. Assuming the Riemann hypothesis, we establish lower bounds for the maximum of Sn(σ,t+h)-Sn(σ,t) near the critical line, on the interval Tβ≤ t ≤ T and in a small range of h. This improves some results of the first author and generalizes a result of the authors on S(t). We also give new omega results for Sn(t), improving a result by Selberg.