Integral Representation for Riemann-Siegel Z(t) function
Abstract
We apply Poisson formula for a strip to give a representation of Z(t) by means of an integral. \[F(t)=∫-∞∞ h(x)ζ(4+ix)7πx-t7\,dx, Z(t)= F(t)(14+t2)12(254+t2)12.\] After that we get the estimate \[Z(t)=(t2π)74\ei(t)H(t)\+O(t-3/4),\] with \[H(t)=∫-∞∞(t2π)ix/2ζ(4+it+ix)7(π x/7)\,dx=(t2π)-74Σn=1∞ 1n12+it21+(t2π n2)-7/2.\] We explain how the study of this function can lead to information about the zeros of the zeta function on the critical line.
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