Improving bounds on prime counting functions by partial verification of the Riemann hypothesis

Abstract

Using a recent verification of the Riemann hypothesis up to height 3· 1012, we provide strong estimates on π(x) and other prime counting functions for finite ranges of x. In particular, we get that |π(x)-li(x)|<x x/8π for 2657≤ x≤ 1.101· 1026. We also provide weaker bounds that hold for a wider range of x, and an application to an inequality of Ramanujan.