Weighted value distributions of the Riemann zeta function on the critical line
Abstract
We prove a central limit theorem for |ζ(1/2+it)| with respect to the measure |ζ(m)(1/2+it)|2kdt (k,m∈ N), assuming RH and the asymptotic formula for twisted and shifted integral moments of zeta. Under the same hypotheses, we also study a shifted case, looking at the measure |ζ(1/2+it+iα)|2kdt, with α∈(-1,1). Finally we prove unconditionally the analogue result in the random matrix theory context.
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