A new bound for the smallest x with π(x) > li(x)
Abstract
We reduce the leading term in Lehman's theorem. This improved estimate allows us to refine the main theorem of Bays and Hudson. Entering 2,000,000 Riemann zeros, we prove that there exists x in the interval [exp(727.951858), exp(727.952178)] for which π(x)-(x) > 3.2 × 10151. There are at least 10154 successive integers x in this interval for which π(x)>(x). This interval is strictly a sub-interval of the interval in Bays and Hudson, and is narrower by a factor of about 12.
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