Jacob's ladders and the first asymptotic formula for the expression of the sixth order |ζ(1/2+i(t)/2)|4|ζ(1/2+it)|2
Abstract
t is proved in this paper that there is a fine correlation between the values of |ζ(1/2+i(t)/2)|4 and |ζ(1/2+it)|2 which correspond to two segments with gigantic distance each from other. This new asymptotic formula cannot be obtained in known theories of Balasubramanian, Heath-Brown and Ivic.
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