The mean square of the error term in the prime number theorem

Abstract

We show that, on the Riemann hypothesis, X∞I(X)/X2 ≤ 0.8603, where I(X) = ∫X2X ((x)-x)2\,dx. This proves (and improves on) a claim by Pintz from 1982. We also show unconditionally that 15\,374≤ I(X)/X2 for sufficiently large X, and that the I(X)/X2 has no limit as X→∞.