Approximate formula for Z(t)
Abstract
The series for the zeta function does not converge on the critical line but the function \[G(t)=Σn=1∞ 1n12+itt2π n2+t\] satisfies Z(t)=2\ei(t)G(t)\+O(t-56+). So one expects that the zeros of zeta on the critical line are very near the zeros of \ei(t)G(t)\. There is a related function U(t) that satisfies the equality Z(t)=2\ei(t)U(t)\.
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