On the integral of Hardy's function
Abstract
If Z(t) = -1/2(1/2+it)ζ(1/2+it) denotes Hardy's function, where ζ(s) = (s)ζ(1-s) is the functional equation of the Riemann zeta-function, then it is proved that ∫0T Z(t) t = O(T1/4+).
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