Sign changes in the prime number theorem
Abstract
Let V(T) denote the number of sign changes in (x) - x for x∈[1, T]. We show that \;T→∞ V(T)/ T ≥ γ1/π + 1.867· 10-30, where γ1 = 14.13… denotes the ordinate of the lowest-lying non-trivial zero of the Riemann zeta-function. This improves on a long-standing result by Kaczorowski.
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